Communications method and apparatus

ABSTRACT

Communications method and apparatus include encoding information into a high-peakedness designed pulse train, converting the designed pulse train into a low-peakedness signal suitable for modulating a narrowband carrier to generate a physical communication signal with desired spectral and temporal properties, and generating and transmitting the physical communication signal. The communications method and apparatus also include receiving and demodulating the physical communication signal, and further converting the demodulated signal into a high-peakedness received pulse train corresponding to the designed pulse train, so that the encoded information may be extracted from the received pulse train.

CROSS REFERENCES TO RELATED APPLICATIONS

This application is a continuation-in-part of U.S. patent application Ser. No. 16/858,603, filed on 25 Apr. 2020, which is a continuation-in-part of the U.S. patent application Ser. No. 16/383,782, filed on 15 Apr. 2019 (now U.S. Pat. No. 10,637,490), which is a continuation-in-part of the U.S. patent application Ser. No. 15/865,569, filed on 9 Jan. 2018 (now U.S. Pat. No. 10,263,635). This application is also related to the U.S. provisional patent application 62/444,828 (filed on 11 Jan. 2017) and 62/569,807 (filed on 9 Oct. 2017).

STATEMENT REGARDING FEDERALLY SPONSORED RESEARCH OR DEVELOPMENT

None.

COPYRIGHT NOTIFICATION

Portions of this patent application contain materials that are subject to copyright protection. The copyright owner has no objection to the facsimile reproduction by anyone of the patent document or the patent disclosure, as it appears in the Patent and Trademark Office patent file or records, but otherwise reserves all copyright rights whatsoever.

TECHNICAL FIELD

The present invention relates in general to the field of data communications and, in particular, to methods and corresponding apparatus for communicating over longer distances at lower power and energy dissipation. This invention further relates to nonlinear signal processing, and, in particular, to method and apparatus for mitigation of outlier noise in the process of analog-to-digital conversion.

BACKGROUND

An outlier is something “abnormal” that “sticks out”. For example, the noise that “protrudes” from background noise. Such noise would typically be, in terms of its amplitude distribution, non-Gaussian. What is actually observed may depend on a source, the way noise couples into a system, and where in the system it is observed. Hence various particular instances of outlier noise may be known under different names, including, but not limited to, such as impulsive noise, transient noise, sparse noise, platform noise, burst noise, crackling noise, clicks & pops, and others. Depending on the way noise couples into a system and where in the system it is observed, noise with the same origin may have different appearances, and may or may not even be seen as an outlier noise.

Non-Gaussian (and, in particular, outlier) noise affecting communication and data acquisition systems may originate from a multitude of natural and technogenic (man-made) phenomena in a variety of applications. Examples of natural outlier (e.g. impulsive) noise sources include ice cracking (in polar regions) and snapping shrimp (in warmer waters) affecting underwater acoustics [1-3]. Electrical man-made noise is transmitted into a system through the galvanic (direct electrical contact), electrostatic coupling, electromagnetic induction, or RF waves. Examples of systems and services harmfully affected by technogenic noise include various sensor, communication, and navigation devices and services [4-15], wireless internet [16], coherent imaging systems such as synthetic aperture radar [17], cable, DSL, and power line communications [18-24], wireless sensor networks [25], and many others. An impulsive noise problem also arises when devices based on the ultra-wideband (UWB) technology interfere with narrowband communication systems such as WLAN [26] or CDMA-based cellular systems [27]. A particular example of non-Gaussian interference is electromagnetic interference (EMI), which is a widely recognized cause of reception problems in communications and navigation devices. The detrimental effects of EMI are broadly acknowledged in the industry and include reduced signal quality to the point of reception failure, increased bit errors which degrade the system and result in lower data rates and decreased reach, and the need to increase power output of the transmitter, which increases its interference with nearby receivers and reduces the battery life of a device.

A major and rapidly growing source of EMI in communication and navigation receivers is other transmitters that are relatively close in frequency and/or distance to the receivers. Multiple transmitters and receivers are increasingly combined in single devices, which produces mutual interference. A typical example is a smartphone equipped with cellular, WiFi, Bluetooth, and GPS receivers, or a mobile WiFi hotspot containing an HSDPA and/or LTE receiver and a WiFi transmitter operating concurrently in close physical proximity. Other typical sources of strong EMI are on-board digital circuits, clocks, buses, and switching power supplies. This physical proximity, combined with a wide range of possible transmit and receive powers, creates a variety of challenging interference scenarios. Existing empirical evidence [8, 28, 29] and its theoretical support [6, 7, 10] show that such interference often manifests itself as impulsive noise, which in some instances may dominate over the thermal noise [5, 8, 28].

A simplified explanation of non-Gaussian (and often impulsive) nature of a technogenic noise produced by digital electronics and communication systems may be as follows. An idealized discrete-level (digital) signal may be viewed as a linear combination of Heaviside unit step functions [30]. Since the derivative of the Heaviside unit step function is the Dirac δ-function [31], the derivative of an idealized digital signal is a linear combination of Dirac δ-functions, which is a limitlessly impulsive signal with zero interquartile range and infinite peakedness. The derivative of a “real” (i.e. no longer idealized) digital signal may thus be viewed as a convolution of a linear combination of Dirac δ-functions with a continuous kernel. If the kernel is sufficiently narrow (for example, the bandwidth is sufficiently large), the resulting signal would appear as an impulse train protruding from a continuous background signal. Thus impulsive interference occurs “naturally” in digital electronics as “di/dt” (inductive) noise or as the result of coupling (for example, capacitive) between various circuit components and traces, leading to the so-called “platform noise” [28]. Additional illustrative mechanisms of impulsive interference in digital communication systems may be found in [6-8, 10, 32].

The non-Gaussian noise described above affects the input (analog) signal. The current state-of-art approach to its mitigation is to convert the analog signal to digital, then apply digital nonlinear filters to remove this noise. There are two main problems with this approach. First, in the process of analog-to-digital conversion the signal bandwidth is reduced (and/or the ADC is saturated), and an initially impulsive broadband noise would appear less impulsive [7-10, 32]. Thus its removal by digital filters may be much harder to achieve. While this may be partially overcome by increasing the ADC resolution and the sampling rate (and thus the acquisition bandwidth) before applying digital nonlinear filtering, this further exacerbates the memory and the DSP intensity of numerical algorithms, making them unsuitable for real-time implementation and treatment of non-stationary noise. Thus, second, digital nonlinear filters may not be able to work in real time, as they are typically much more computationally intensive than linear filters. A better approach would be to filter impulsive noise from the analog input signal before the analog-to-digital converter (ADC), but such methodology is not widely known, even though the concepts of rank filtering of continuous signals are well understood [32-37].

Further, common limitations of nonlinear filters in comparison with linear filtering are that (1) nonlinear filters typically have various detrimental effects (e.g., instabilities and intermodulation distortions), and (2) linear filters are generally better than nonlinear in mitigating broadband Gaussian (e.g. thermal) noise.

As the use and necessity of communications grows, the development of secure communications has become a priority to enable the use of various (e.g. wireless or wired) communication links without fear of compromising secure information. As cryptography is the standard way of ensuring security of a communication channel, steganography steps in to provide even stronger assumptions. Thus, in the case of cryptology, an attacker cannot obtain information about the payload while inspecting its encrypted content. In the case of steganography, one cannot prove the existence of the covert communication itself. The purpose of steganography is to hide the very presence of communication by embedding messages into innocuous-looking cover objects, such as digital images. To accommodate a secret message, the original message, also called the cover message, or cover signal, is slightly modified by the embedding algorithm to obtain the stego signal. In steganography, the cover signal is a mere decoy and has no relationship to the hidden data.

The most important requirement for a steganographic system is undetectability: stego signals should be statistically indistinguishable from cover signals. In other words, there should be no artifacts in the stego signal that could be detected by an attacker with probability better than random guessing, given the full knowledge of the way the embedding of the hidden data is performed, including the statistical properties of the source of cover signals, except for the stego key.

While in steganography the information is hidden or embedded into a cover signal, a covert channel allows parties to communicate “unseen,” hiding the very fact that communication is even occurring.

The additive white Gaussian noise (AWGN) capacity C of a channel operating in the power-limited regime (i.e. when the received signal-to-noise ratio (SNR) is small, SNR<<0 dB) may be expressed as C≈P/(N₀ ln 2), where P is the average received power and N₀ is the power spectral density (PSD) of the noise. This capacity is linear in power and insensitive to bandwidth and, therefore, by spreading the average transmitted power of the information-carrying signal over a large frequency band, the average PSD of the signal could be made much smaller than the PSD of the noise. This would “hide” the signal in the channel noise, making the transmission covert and insensitive to narrowband interference.

One of the common ways to achieve such “spreading” is frequency-hopping spread spectrum (FHSS) [38]. This technique is widely used, for example, in legacy military equipment for low-probability-of-intercept (LPI) communications. However, using frequency hopping for covert communications is nearly obsolete today, since modern wideband software-defined radio (SDR) receivers may capture all of the hops and put them back together.

Another common and widely used spread-spectrum modulation technique is direct-sequence spread spectrum (DSSS) [39]. In DSSS, the narrow-band information-carrying signal of a given power is modulated by a wider-band, unit-power pseudorandom signal known as a spreading sequence. This results in a signal with the same total power but a larger bandwidth, and thus a smaller PSD. After demodulation (“de-spreading”) in the receiver, the original information-carrying signal is restored. However, such demodulation requires a precise synchronization, which is perhaps the most difficult and expensive aspect of a DSSS receiver design. Also, while de-spreading may not be performed without the knowledge of the spreading sequence by the receiver, the spreading code by itself may not be usable to secure the channel. For example, linear spreading codes are easily decipherable once a short sequential set of chips from the sequence is known. To improve security, it would be desirable to perform a “code hopping” in a manner akin to the frequency hopping. However, synchronization may be an extremely slow process for pseudorandom sequences, especially for large spreading waveforms (long codes), and thus such DSSS code hopping may be difficult to realize in practice.

In the power-limited regime, we would normally use binary coding and modulation (e.g. binary phase-shift keying (BPSK) or quadrature phase-shift keying (QPSK)) for the narrow-band information-carrying signal, and this signal would be significantly oversampled to enable wideband spreading. Thus an idealized narrow-band information-carrying signal that is to be “spread” may be viewed as a discrete-level signal that is a linear combination of analog Heaviside unit step functions [30] delayed by multiples of the bit duration. Such a signal would have a limited bandwidth and a finite power. Since the derivative of the Heaviside unit step function is the Dirac δ-function [31], the derivative of this idealized signal would be a “pulse train” that is a linear combination of Dirac δ-functions. This pulse train would contain all the information encoded in the discrete-level signal, and it would have infinitely wide bandwidth and infinitely large power. Both the bandwidth and the power may then be reduced to the desired levels by filtering the pulse train with a lowpass filter. If the time-bandwidth product (TBP) of the filter is sufficiently small so that the pulses in the filtered pulse train do not overlap, these pulses would still contain all the intended information.

On the one hand, converting a narrow-band signal into a wideband pulse train has an apparent appeal of no need for “de-spreading”: One may simply obtain samples at the peaks of the pulses to obtain all the information encoded in the signal. On the other hand, at first glance such a pulse train is not suitable for practical communication systems, and especially for covert communications. Indeed, let us consider a pulse train with a given average pulse rate and power. The average PSD of this train could be made arbitrary small, since it is inversely proportional to the bandwidth. However, the peak-to-average power ratio (PAPR) of such a train would be proportional to the bandwidth, making the wideband signal extremely impulsive (super-Gaussian). First, such high crest factor of the pulse train puts a serious burden on the transmitter hardware, potentially making this burden prohibitive (e.g. for PAPR>30 dB). Secondly, the high-PAPR structure of a pulse train makes it easily detectable by simple thresholding in the time domain, seemingly making it unsuitable for covert communications. Thirdly, it may appear that sharing the wideband channel by multiple users would require explicit allocation of the pulse arrival times for each sub-channel, which would be impractical in most cases.

Further objects and features of the present invention will become apparent to the ones skilled in the art upon examination of the following description and the accompanying drawings. It is intended that any additional objects and features be incorporated herein.

Time Domain Analysis of 1st- and 2nd-Order Delta-Sigma (ΔΣ) ADCs with Linear Analog Loop Filters

Nowadays, delta-sigma (ΔΣ) ADCs are used for converting analog signals over a wide range of frequencies, from DC to several megahertz. These converters comprise a highly oversampling modulator followed by a digital/decimation filter that together produce a high-resolution digital output [40-42]. As discussed in this section, which reviews the basic principle of operation of ΔΣ ADCs from a time domain prospective, a sample of the digital output of a ΔΣ ADC represents its continuous (analog) input by a weighted average over a discrete time interval (that should be smaller than the inverted Nyquist rate) around that sample.

Since frequency domain representation is of limited use in analysis of nonlinear systems, let us first describe the basic ΔΣ ADCs with 1st- and 2nd-order linear analog loop filters in the time domain. Such 1st- and 2nd-order ΔΣ ADCs are illustrated in panels I and II of FIG. 1 , respectively. Note that the vertical scales of the shown fragments of the signal traces vary for different fragments.

Without loss of generality, we may assume that if the input D to the flip-flop is greater than zero, D>0, at a specific instance in the clock cycle (e.g. the rising edge), then the output Q takes a negative value Q=−V_(c). If D<0 at a rising edge of the clock, then the output Q takes a positive value Q=V_(c). At other times, the output Q does not change. We also assume in this example that x(t) is effectively band-limited, and is bounded by V_(c) so that |x(t)|<V_(c) for all t. Further, the clock frequency F_(s) is significantly higher (e.g. by more than about 2 orders of magnitude) than the bandwidth B_(x) of x(t), log₁₀(F_(s)/B_(x))≳2. It may be then shown that, with the above assumptions, the input D to the flip-flop would be a zero-mean signal with an average zero crossing rate much higher than the bandwidth of x(t).

Note that in the limit of infinitely large clock frequency F_(s) (F_(s)→∞) the behavior of the flip-flop would be equivalent to that of an analog comparator. Thus, while in practice a finite flip-flop clock frequency is used, based on the fact that it is orders of magnitude larger that the bandwidth of the signal of interest we may use continuous-time (e.g. (w*y)(t) and x(t−Δt)) rather than discrete-time (e.g. (w*y)[k] and x[k−m]) notations in reference to the ADC outputs, as a shorthand to simplify the mathematical description of our approach.

As can be seen in FIG. 1 , for the 1st-order modulator shown in panel I x(t)−y(t)=0,   (1) and for the 2nd-order modulator shown in panel II

$\begin{matrix} {{\overset{\_}{\overset{.}{\mathcal{y}}(t)} = {\frac{1}{\tau}\left\lbrack \overset{\_}{{x(t)} - {{\mathcal{y}}(t)}} \right\rbrack}},} & (2) \end{matrix}$ where the overdot denotes a time derivative, and the overlines denote averaging over a time interval between any pair of threshold (including zero) crossings of D (such as, e.g., the interval ΔT shown in FIG. 1 ). Indeed, for a continuous function ƒ(t), the time derivative of its average over a time interval ΔT may be expressed as

$\begin{matrix} {{\overset{\_}{\overset{.}{f}(t)} = {\overset{.}{\overset{\_}{f(t)}} = {{\frac{d}{dt}\left\lbrack {\frac{1}{\Delta T}{\int_{t - {\Delta T}}^{t}{{ds}{f(s)}}}} \right\rbrack} = {\frac{1}{\Delta T}\left\lbrack {{f(t)} - {f\left( {t - {\Delta T}} \right)}} \right\rbrack}}}},} & (3) \end{matrix}$ and it will be zero if ƒ(t)−ƒ(t−ΔT)=0.

Now, if the time averaging is performed by a lowpass filter with an impulse response w(t) and a bandwidth B_(w) much smaller than the clock frequency, B_(w)<<F_(s), equation (1) implies that the filtered output of the 1st-order ΔΣ ADC would be effectively equal to the filtered input, (w*y)(t)=(w*x)(t)+δy,  (4) where the asterisk denotes convolution, and the term δy (the “ripple”, or “digitization noise”) is small and will further be neglected. We would assume from here on that the filter w(t) has a flat frequency response and a constant group delay Δt over the bandwidth of x(t). Then equation (4) may be rewritten as (w*y)(t)=x(t−Δt),  (5) and the filtered output would accurately represent the input signal.

Since y(t) is a two-level staircase signal with a discrete step duration n/F_(s), where n is a natural (counting) number, it may be accurately represented by a 1-bit discrete sequence y[k] with the sampling rate F_(s). Thus the subsequent conversion to the discrete (digital) domain representation of x(t) (including the convolution of y[k] with w[k] and decimation to reduce the sampling rate) is rather straightforward and will not be discussed further.

If the input to a 1st-order ΔΣ ADC consists of a signal of interest x(t) and an additive noise n(t), then the filtered output may be written as (w*y)(t)=x(t−Δt)+(w*v)(t),  (6) provided that |x(t−Δt)+(w*v)(t)|<V_(c) for all t. Since w(t) has a flat frequency response over the bandwidth of x(t), it would not change the power spectral density of the additive noise v(t) in the signal passband, and the only improvement in the passband signal-to-noise ratio for the output (w*y)(t) would come from the reduction of the quantization noise δy by a well designed filter w(t).

Similarly, equation (2) implies that the filtered output of the 2nd-order ΔΣ ADC would be effectively equal to the filtered input further filtered by a 1st order lowpass filter with the time constant τ and the impulse response h_(τ)(t), (w*y)(t)=(h _(τ) *w*x)(t).  (7) From the differential equation for a 1st order lowpass filter it follows that h_(τ)*(w+τ{dot over (w)})=w, and thus we may rewrite equation (7) as (h _(τ)*(w+τ{dot over (w)})*y)(t)=(h _(τ) *w*x)(t).  (8) Provided that τ is sufficiently small (e.g., τ≲1/(4πB_(x))), equation (8) may be further rewritten as ((w+τ{dot over (w)})*y)(t)=(w*x)(t)=x(t−Δt).  (9) The effect of the 2nd-order loop filter on the quantization noise δy is outside the scope of this disclosure and will not be discussed.

SUMMARY

Since at any given frequency a linear filter affects both the noise and the signal of interest proportionally, when a linear filter is used to suppress the interference outside of the passband of interest the resulting signal quality is affected only by the total power and spectral composition, but not by the type of the amplitude distribution of the interfering signal. Thus a linear filter cannot improve the passband signal-to-noise ratio, regardless of the type of noise. On the other hand, a nonlinear filter has the ability to disproportionately affect signals with different temporal and/or amplitude structures, and it may reduce the spectral density of non-Gaussian (e.g. impulsive) interferences in the signal passband without significantly affecting the signal of interest. As a result, the signal quality may be improved in excess of that achievable by a linear filter. Such non-Gaussian (and, in particular, impulsive, or outlier, or transient) noise may originate from a multitude of natural and technogenic (man-made) phenomena. The technogenic noise specifically is a ubiquitous and growing source of harmful interference affecting communication and data acquisition systems, and such noise may dominate over the thermal noise. While the non-Gaussian nature of technogenic noise provides an opportunity for its effective mitigation by nonlinear filtering, current state-of-the-art approaches employ such filtering in the digital domain, after analog-to-digital conversion. In the process of such conversion, the signal bandwidth is reduced, and the broadband non-Gaussian noise may become more Gaussian-like. This substantially diminishes the effectiveness of the subsequent noise removal techniques.

The present invention overcomes the limitations of the prior art through incorporation of a particular type of nonlinear noise filtering of the analog input signal into nonlinear analog filters preceding an ADC, and/or into loop filters of ΔΣ ADCs. Such ADCs thus combine analog-to-digital conversion with analog nonlinear filtering, enabling mitigation of various types of in-band non-Gaussian noise and interference, especially that of technogenic origin, including broadband impulsive interference. This may considerably increase quality of the acquired signal over that achievable by linear filtering in the presence of such interference. An important property of the presented approach is that, while being nonlinear in general, the proposed filters would largely behave linearly. They would exhibit nonlinear behavior only intermittently, in response to noise outliers, thus avoiding the detrimental effects, such as instabilities and intermodulation distortions, often associated with nonlinear filtering.

The intermittently nonlinear filters of the present invention would also enable separation of signals (and/or signal components) with sufficiently different temporal and/or amplitude structures in the time domain, even when these signals completely or partially overlap in the frequency domain. In addition, such separation may be achieved without reducing the bandwidths of said signal components.

Even though the nonlinear filters of the present invention are conceptually analog filters, they may be easily implemented digitally, for example, in Field Programmable Gate Arrays (FPGAs) or software. Such digital implementations would require very little memory and would be typically inexpensive computationally, which would make them suitable for real-time signal processing.

To meet the undetectability requirement, in a steganographic system the stego signals should be statistically indistinguishable from the cover signals. For physical layer transmissions, undetectability may be enhanced by requiring that the payload and the cover have the same bandwidth and spectral content, the same apparent temporal and amplitude structures, and that there are no explicit differences in the spectral and/or temporal allocations for the cover signals and the payload messages. For a mixture of such signals, neither linear nor nonlinear filtering alone can separate the signals. Favorably, however, linear filtering may significantly, and differently, affect the temporal and amplitude structure of many natural and the majority of technogenic (man-made) signals. For example, such filtering can often convert the amplitude distribution of a pulse train from super-Gaussian into apparently Gaussian and/or sub-Gaussian, and vice versa. On the other hand, a nonlinear filter is capable of disproportionately affecting spectral densities of signals with distinct temporal and/or amplitude structures even when the signals have the same spectral content. Therefore, in the present invention a proper synergistic combination of linear and nonlinear filtering is employed to effectively separate such “indistinguishable” cover and stego signals.

Another object of the present invention is data communications and, in particular, communicating over longer distances at lower power and energy dissipation. For example, in low-power wide-area networks (LPWANs), various trade-offs among the bandwidth, data rates, and energy per bit have different effects on the quality of service under different propagation conditions (e.g. fading and multipath), interference scenarios, multi-user requirements, and design constraints. Such compromises, and the manner in which they are implemented, further affect other technical aspects, such as system's computational complexity and power efficiency. At the same time, this difference in trade-offs also adds to the technical flexibility in addressing a broader range of communications applications, both static and mobile. In the communications method and apparatus of the present invention the control of the quality of service is performed through the change in the spectral efficiency (i.e., the data rate at a given bandwidth), and/or through changing the energy per bit as an additional trade-off parameter.

Further scope and the applicability of the invention will be clarified through the detailed description given hereinafter. It should be understood, however, that the specific examples, while indicating preferred embodiments of the invention, are presented for illustration only. Various changes and modifications within the spirit and scope of the invention should become apparent to those skilled in the art from this detailed description. Furthermore, all the mathematical expressions, diagrams, and the examples of hardware implementations are used only as a descriptive language to convey the inventive ideas clearly, and are not limitative of the claimed invention.

BRIEF DESCRIPTION OF FIGURES

FIG. 1 . ΔΣ ADCs with 1st-order (I) and 2nd-order (II) linear loop filters.

FIG. 2 . Simplified diagram of improving receiver performance in the presence of impulsive interference.

FIG. 3 . Illustrative ABAINF block diagram.

FIG. 4 . Illustrative examples of the transparency functions and their respective influence functions.

FIG. 5 . Block diagrams of CMTFs with blanking ranges [α⁻, α₊] (a) and [V⁻, V₊]/G (b).

FIG. 6 . Resistance of CMTF to outlier noise. The cross-hatched time intervals in panel (c) correspond to nonlinear CMTF behavior (zero rate of change).

FIG. 7 . Illustration of differences in the error signal for the example of FIG. 6 . The cross-hatched time intervals indicate nonlinear CMTF behavior (zero rate of change).

FIG. 8 . Simplified illustrated schematic of CMTF circuit implementation.

FIG. 9 . Resistance of the CMTF circuit of FIG. 8 to outlier noise. The cross-hatched time intervals in the lower panel correspond to nonlinear CMTF behavior.

FIG. 10 . Using sums and/or differences of input and output of CMTF and its various intermediate signals for separating impulsive (outlier) and non-impulsive signal components.

FIG. 11 . Illustration of using CMTF with appropriate blanking range for separating impulsive and non-impulsive (“background”) signal components.

FIG. 12 . Illustrative block diagrams of an ADiC with time parameter τ and blanking range [α⁻, α₊].

FIG. 13 . Simplified illustrative electronic circuit diagram of using CMTF with appropriately chosen blanking range [α⁻, α₊] for separating incoming signal x(t) into impulsive i(t) and non-impulsive s(t) (“background”) signal components.

FIG. 14 . Illustration of separating incoming signal x(t) into impulsive i(t) and non-impulsive s(t) (“background”) components by the circuit of FIG. 13 .

FIG. 15 . Illustration of separation of discrete input signal “x” into impulsive component “aux” and non-impulsive (“background”) component “prime” using the MATLAB function of § 2.5 with appropriately chosen blanking values “alpha_p” and “alpha_m”.

FIG. 16 . Illustrative block diagram of a circuit implementing equation (21) and thus tracking a qth quantile of y(t).

FIG. 17 . Illustration of MTF convergence to steady state for different initial conditions.

FIG. 18 . Illustration of QTFs' convergence to steady state for different initial conditions.

FIG. 19 . Illustration of separation of discrete input signal “x” into impulsive component “aux” and non-impulsive (“background”) component “prime” using the MATLAB function of § 3.3 with the blanking range computed as Tukey's range using digital QTFs.

FIG. 20 . Transparency function described by equation (30).

FIG. 21 . Illustrative block diagram of an adaptive intermittently nonlinear filter for mitigation of outlier noise in the process of analog-to-digital conversion.

FIG. 22 . Equivalent block diagram for the filter shown in FIG. 21 operating in linear regime.

FIG. 23 . Impulse and frequency responses of w[k] and w[k]+τ{dot over (w)}[k] used in the subsequent examples.

FIG. 24 . Comparison of simulated channel capacities for the linear processing chain (solid curves) and the CMTF-based chains with β=3 (dotted and dashed curves). The dashed curves correspond to channel capacities for the CMTF-based chain with added interference in an adjacent channel. The asterisks correspond to the noise and adjacent channel interference conditions used in FIG. 25 .

FIG. 25 . Illustration of changes in the signal time- and frequency domain properties, and in its amplitude distributions, while it propagates through the signal processing chains, linear (points (a), (b), and (c) in panel II of FIG. 22 ), and the CMTF-based (points I through IV, and point V, in FIG. 21 ).

FIG. 26 . Alternative topology for signal processing chain shown in FIG. 21 .

FIG. 27 . ΔΣ ADC with an CMTF-based loop filter.

FIG. 28 . Modifying the amplitude density of the difference signal x−y by a 1st order lowpass filter.

FIG. 29 . Impulse and frequency responses of w[k] and w[k]+(4πB_(x))⁻¹[k] used in the examples of FIG. 30 .

FIG. 30 . Comparative performance of ΔΣ ADCs with linear and nonlinear analog loop filters.

FIG. 31 . Resistance of ΔΣ ADC with CMTF-based loop filter to increase in impulsive noise.

FIG. 32 . Outline of ΔΣ ADC with adaptive CMTF-based loop filter.

FIG. 33 . Comparison of simulated channel capacities for the linear processing chain (solid lines) and the CMTF-based chains with β=1.5 (dotted lines). The meaning of the asterisks is explained in the text.

FIG. 34 . Reduction of the spectral density of impulsive noise in the signal baseband without affecting that of the signal of interest.

FIG. 35 . Reduction of the spectral density of impulsive noise in the signal baseband without affecting that of the signal of interest. (Illustration similar to FIG. 34 with additional interference in an adjacent channel.)

FIG. 36 . Illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and ADiC-based digital filtering (panel (b)).

FIG. 37 . Illustrative time-domain traces at points I through VI of FIG. 36 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise).

FIG. 38 . Illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and CMTF-based digital filtering (panel (b)).

FIG. 39 . Illustrative time-domain traces at points I through VI of FIG. 38 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise).

FIG. 40 . Illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and ADiC-based digital filtering (panel (b)), with additional clipping of the analog input signal.

FIG. 41 . Illustrative time-domain traces at points I through VI of FIG. 40 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise).

FIG. 42 . Illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and CMTF-based digital filtering (panel (b)), with additional clipping of the analog input signal.

FIG. 43 . Illustrative time-domain traces at points I through VI of FIG. 42 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise).

FIG. 44 . Alternative ADiC structure.

FIG. 45 . Illustrative examples of differential influence functions and their respective difference responses.

FIG. 46 . Alternative ADiC structure with a boxcar depreciator.

FIG. 47 . Illustrative signal traces for the ADiC shown in FIG. 46 with the DCL established by a linear lowpass filter.

FIG. 48 . Illustrative signal traces for the ADiC shown in FIG. 46 with the DCL established by a TTF.

FIG. 49 . Illustrative signal traces for the ADiC shown in FIG. 46 with the DCL established by a TTF (continued).

FIG. 50 . Simplified ADiC structure.

FIG. 51 . Example of a simplified ADiC structure with a differential blanker as a depreciator.

FIG. 52 . Illustrative electronic circuit for the ADiC structure shown in FIG. 51 .

FIG. 53 . Illustrative signal traces for the ADiC shown in FIG. 52 (LTspice simulation).

FIG. 54 . Example of applying a numerical version of an ADiC described in Section 8 to the input signal used in FIG. 15 .

FIG. 55 . Two cascaded ADiCs (panel (a)), and an alternative cascaded ADiC structure (panel (b)).

FIG. 56 . Illustrative time-domain traces for the ADiC structures shown in FIG. 55 .

FIG. 57 . Illustrative block diagram of a complex-valued CMTF.

FIG. 58 . Illustrative use of a complex-valued ADiC for interference mitigation in a quadrature receiver (QPSK-modulated signal).

FIG. 59 . Example of complex-valued ADiC structure.

FIG. 60 . Example of degrading signal of interest by removing “outliers” instead of “outlier noise”.

FIG. 61 . Illustration of “excess band” observation of outlier noise.

FIG. 62 . Illustrative examples of excess band responses.

FIG. 63 . Illustrative example of spectral inversion by ADiC.

FIG. 64 . Illustrative example of spectral “cockroach effect” caused by outlier removal.

FIG. 65 . Illustration of complementary ADiC filtering (CAF) structure for ADiC-based outlier noise mitigation for passband signal.

FIG. 66 . Complementary ADiC filter (CAF) for removing wideband noise outliers while preserving band-limited signal of interest.

FIG. 67 . CAF block diagram.

FIG. 68 . Analog (panel (a)) and digital (panel (b)) ABAINF deployment for mitigation of non-Gaussian (e.g. outlier) noise in the process of analog-to-digital conversion.

FIG. 69 . Analog (panel (a)) and digital (panel (b)) ABAINF-based outlier filtering in ΔΣ ADCs.

FIG. 70 . Example of a ΔΣ ADC with an ADIC-based decimation filter for enhanced interference mitigation.

FIG. 71 . Example of using a 1st order highpass filter prior to ADiC for enhanced interference mitigation.

FIG. 72 . Impulse and frequency responses of w[k] and w[k]+Δw[k] used in the example of FIG. 71 .

FIG. 73 . Illustration of spectral reshaping of impulsive noise by an ADiC.

FIG. 74 . Example of using ADiC-based filtering for mitigation of impulsive noise in the presence of strong adjacent channel interference.

FIG. 75 . Two signal processing chains for the example described in § 11.5.

FIG. 76 . Examples of the time-domain traces and the PSDs of the signals at points I, II, III, IV, and V in FIG. 75 .

FIG. 77 . Example of a ΔΣ ADC with an ADIC-based decimation filter for mitigation of wideband impulsive noise affecting the baseband signal of interest in the presence of a strong adjacent-channel interference.

FIG. 78 . Example of using ADiC-based filtering in direct conversion receiver architecture with quadrature baseband ADCs.

FIG. 79 . Example of using ADiC-based filtering in superheterodyne receivers.

FIG. 80 . Example of a conceptual schematic of a sub-circuit for an OTA-based implementation of a depreciator with the transparency function given by equation (30) and depicted in FIG. 20 .

FIG. 81 . Example of an OTA-based squaring circuit (e.g. “SQ” circuit in FIG. 59 ) for a complex-valued signal.

FIG. 82 . Example of a conceptual schematic of a sub-circuit for an OTA-based implementation of a depreciator with the transparency function depicted in FIGS. 57 and 59 and given by equation (62).

FIG. 83 . Illustration of pileup effect: When “width” of pulses becomes greater than distance between them, pulses may begin to overlap and interfere with each other. For pulses with same spectral content, PSDs of pulse sequences are identical, yet their temporal and amplitude structures are substantially different.

FIG. 84 . Pairs of matched filters with different time-bandwidth products, but same frequency responses and same “combined” impulse response. In this example, w(t) is root-raised-cosine filter, and thus (w*w)(t) is raised-cosine filter.

FIG. 85 . Example of FIG. 84 extended to two dimensions.

FIG. 86 . Using pileup effect for obfuscation of temporal and amplitude structure of transmitted signal. In transmitter, filtering with large-TBP filter reduces crest factor of pulse train, making it appear as Gaussian or sub-Gaussian. In receiver, filtering with matched filter restores signal's distinct temporal and amplitude structure.

FIG. 87 . Relations among rate, PAPR, and SNR in pulse train used for low-SNR communications. For TBP=1 and 10⁻²≤ε≤10⁻³, “raw” rate limits for detectible pulses of equal magnitudes vary from few percent (for pulse counting) to about half of Shannon rate (for synchronous pulse detection).

FIG. 88 . Intermittently Nonlinear Filtering (INF): Outliers are identified as protrusions outside of fenced range, and their values are replaced by those in mid-range. Otherwise, signal is not affected. “Auxiliary” output is difference between input and “prime” INF output.

FIG. 89 . For low pulse rates

$\left( {{e.g.\mathcal{R}} \ll {\frac{1}{2}\Delta B/{TBP}}} \right),$ IQR provides reliable measure of additive Gaussian noise power, σ_(n)∝IQR. Root-raised-cosine pulses (for which

₀=(4T_(s))⁻¹) are used in this example.

FIG. 90 . Overall behavior of QTF fencing is similar to that with “exact” quartile filters in moving boxcar window of width ΔT=2×IQR/μ.

FIG. 91 . Simplified diagram of first example (Section 12.5.1).

FIG. 92 . Detailed particular example for basic concept highlighted in FIG. 91 .

FIG. 93 . Simplified diagram of second example (Section 12.5.2).

FIG. 94 . Both high-SNR and low-SNR pulse trains are disguised as Gaussian noises with same spectral content. In this example, time duration of g₁₂(t) is not much larger than average time interval between pulses in x₁(t), and thus x₁*(t) is slightly sub-Gaussian.

FIG. 95 . Both high-SNR and low-SNR pulse trains are recovered in receiver. First INF accomplishes both recovery of high-SNR pulse train and its removal from mixture.

FIG. 96 . Impulse responses of filters used in FIGS. 94 and 95 , and their convolutions.

FIG. 97 . Basic concept of “friendly in-band jamming.”

FIG. 98 . OFDM PAPR reduction by large-TBP filter.

FIG. 99 . Friendly in-band jamming of OFDM signal. Combination of linear and nonlinear filtering in receiver is used for effective separation of OFDM and “friendly jamming” signals, although both signals in received mixture have effectively same spectral characteristics and temporal and amplitude structures, and there are no explicit differences in their temporal allocations.

FIG. 100 . PAPR(N_(p))≈1.143N_(p)/N_(s) for N_(p)/N_(s)>>1 for RC pulses with β=½.

FIG. 101 . AWGN SNR limits for different BER as functions of samples between pulses for raised-cosine pulses with β=½ and N_(s)=2.

FIG. 102 . Illustration of synchronization procedure described by (74) through (77). AWGN SNR=−20 dB is chosen to be low, and M=32 respectively high, to emphasize robustness even when BER≈⅓.

FIG. 103 . Calculated and simulated BERs as functions of AWGN SNRs for N_(p)=32 and N_(p)=256. For shown SNR ranges, MPA function with M=8 provides reliable synchronization. (Compare with SNR limits in FIG. 101 .)

FIG. 104 . For BER smaller than about 10⁻¹, less computationally expensive modulo magnitude averaging (e.g. given by (78)) can be used for synchronization. Modulo power averaging (with “extra point,” e.g. given by (74)) should be used when reliable synchronization for full BER range is desired.

FIG. 105 . Transmitter waveform is constructed as sum of scaled and time-shifted/delayed large-TBP pulses. In receiver, IIR allpass filter is used to recover small-TBP pulse train.

FIG. 106 . Comparative illustration of PAPR and K_(dBG) as measures of peakedness for pulse trains.

FIG. 107 . Using pulse trains for low-SNR communications: Large-TBP pulse shaping (i) “hides” pulse train, obscuring its temporal and amplitude structure, and (ii) reduces its PAPR, making signal suitable for transmission. In receiver, pulse train is restored by matched large-TBP filtering. High PAPR of restored pulse train enables low-SNR messaging. To make link more robust to outlier interference and to increase apparent SNR, analog-to-digital conversion in receiver may be combined with intermittently nonlinear filtering.

FIG. 108 . Illustration of transmitter for single-sideband M-ary ASPM link with constant-envelope pulses and M=8 (three bits per pulse) for noncoherent detection and M=16 (four bits per pulse) for coherent detection.

FIG. 109 . Illustration of noncoherent and coherent receivers for single-sideband M-ary ASPM link with M=8 (three bits per pulse) for noncoherent detection and M=16 (four bits per pulse) for coherent detection.

FIG. 110 . Illustration of transmitter for single-sideband M-ary ASPM link with constant-envelope pulses and M=32 (five bits per pulse) for noncoherent detection and M=64 (six bits per pulse) for coherent detection.

FIG. 111 . Illustration of noncoherent and coherent receivers for single-sideband M-ary ASPM link with M=32 (five bits per pulse) for noncoherent detection and M=64 (six bits per pulse) for coherent detection.

FIG. 112 . Uncoded BER vs. E_(b)/N₀ performances of coherent and noncoherent M-ASPM in AWGN channel for several values of M.

FIG. 113 . Uncoded BER vs. SNR performance of coherent and noncoherent M-ASPM in AWGN channel for several values of M.

FIG. 114 . Illustration of pulse shaping for single-sideband constant-envelope M-ASPM with information encoded in plurality of equidistant designed pulse trains.

ABBREVIATIONS

ABAINF: Analog Blind Adaptive Intermittently Nonlinear Filter; ACF: autocorrelation function; A/D: Analog-to-Digital; ADC: Analog-to-Digital Converter (or Conversion); ADiC: Analog Differential Clipper; AFE: Analog Front End; AGC: Automatic Gain Control; ASIC: Application-Specific Integrated Circuit; ASPM: Aggregate Spread Pulse Modulation; ASSP: Application-Specific Standard Product; AWGN: Additive White Gaussian Noise;

BAINF: Blind Adaptive Intermittently Nonlinear Filter; BER: Bit Error Rate, or Bit Error Ratio; BPSK: Binary Phase-Shift Keying;

CAF: Complementary ADiC Filter (or Filtering); CDL: Canonical Differential Limiter; CDMA: Code Division Multiple Access; CINF: Complementary Intermittently Nonlinear Filter (or Filtering); CLT: Central Limit Theorem; CMTF: Clipped Mean Tracking Filter; COTS: Commercial Off-The-Shelf; CPD: Coincidence Pulse Detection;

D/A: Digital-to-Analog; DAC: Digital-to-Analog Converter (or Conversion); DCL: Differential Clipping Level; DELDC: Dual Edge Limit Detector Circuit; DFT: Discrete Fourier Transform; DSP: Digital Signal Processing/Processor;

EMC: electromagnetic compatibility; EMI: electromagnetic interference; ENBW: equivalent noise bandwidth;

FFT: Fast Fourier Transform; FIR: Finite Impulse Response; FPGA: Field Programmable Gate Array;

HSDPA: High Speed Downlink Packet Access;

IC: Integrated Circuit; IF: Intermediate Frequency; IDFT: Inverse Discrete Fourier Transform; INF: Intermittently Nonlinear Filter (or Filtering); i.i.d.: Independent and Identically Distributed; IoT: Internet of Things; I/Q: In-phase/Quadrature; IQR: interquartile range;

LNA: Low-Noise Amplifier; LO: Local Oscillator; LoRa: Long Range (proprietary LPWAN modulation technique); LPI: Low-Probability-of-Intercept; LPWAN: Low-Power Wide-Area Network;

MAD: Mean/Median Absolute Deviation; M-ASPM: M-ary Aggregate Spread Pulse Modulation; MATLAB: MATrix LABoratory (numerical computing environment and fourth-generation programming language developed by MathWorks); MCA: Modulo Count Averaging; MCT: Measure of Central Tendency; MMA: Modulo Magnitude Averaging; MOS: Metal-Oxide-Semiconductor; MPA: Modulo Power Averaging; MTF: Median Tracking Filter;

NDL: Nonlinear Differential Limiter;

OOB: Out-Of-Band; ORB: Outlier-Removing Buffer; OTA: Operational Transconductance Amplifier;

PAPR: Peak-to-Average Power Ratio; PDF: Probability Density Function; PHY: physical layer; PSD: Power Spectral Density; PSF: Pulse Shaping Filter;

QTF: Quartile (or Quantile) Tracking Filter;

RC: Raised-Cosine; RF: Radio Frequency; RFI: Radio Frequency Interference; RMS: Root Mean Square; RRC: Robust Range Circuit; RRC: Root Raised Cosine; RX: Receiver;

SNR: Signal-to-Noise Ratio; SCS: Switch Control Signal; SPDT: Single Pole Double-Throw switch; SRRC: Square-Root-Raised-Cosine;

TBP: Time-Bandwidth Product; TTF: Trimean Tracking Filter; TX: Transmitter; UWB: Ultra-wide-band;

WCC: Window Comparator Circuit; WDC: Window Detector Circuit; WMCT: Windowed Measure of Central Tendency; WML: Windowed Measure of Location;

VGA: Variable-Gain Amplifier

DETAILED DESCRIPTION

As required, detailed embodiments of the present invention are disclosed herein. However, it is to be understood that the disclosed embodiments are merely exemplary of the invention that may be embodied in various and alternative forms. The figures are not necessarily to scale; some features may be exaggerated or minimized to show details of particular components. Therefore, specific structural and functional details disclosed herein are not to be interpreted as limiting, but merely as a representative basis for the claims and/or as a representative basis for teaching one skilled in the art to variously employ the present invention.

Moreover, except where otherwise expressly indicated, all numerical quantities in this description and in the claims are to be understood as modified by the word “about” in describing the broader scope of this invention. Practice within the numerical limits stated is generally preferred. Also, unless expressly stated to the contrary, the description of a group or class of components as suitable or preferred for a given purpose in connection with the invention implies that mixtures or combinations of any two or more members of the group or class may be equally suitable or preferred.

It should be understood that the word “analog”, when used in reference to various embodiments of the invention, is used only as a descriptive language to convey the inventive ideas clearly, and is not limitative of the claimed invention. Specifically, the word “analog” mainly refers to using differential and/or integral equations (and thus such analog-domain operations as differentiation, antidifferentiation, and convolution) in describing various signal processing structures and topologies of the invention. In reference to numerical or digital implementations of the disclosed analog structures, it is to be understood that such numerical or digital implementations simply represent finite-difference approximations of the respective analog operations and thus may be accomplished in a variety of alternative ways.

For example, a “numerical derivative” of a quantity x(t) sampled at discrete time instances t_(k) such that t_(k+1)=t_(k)+dt should be understood as a finite difference expression approximating a “true” derivative of x(t). One skilled in the art will recognize that there exist many such expressions and algorithms for estimating the derivative of a mathematical function or function subroutine using discrete sampled values of the function and perhaps other knowledge about the function. However, for sufficiently high sampling rates, for digital implementations of the analog structures described in this disclosure simple two-point numerical derivative expressions may be used. For example, a numerical derivative of x(t_(k)) may be obtained using the following expressions:

$\begin{matrix} {{{\overset{.}{x}\left( t_{k} \right)} = \frac{{x\left( t_{k + 1} \right)} - {x\left( t_{k} \right)}}{dt}},} & (10) \end{matrix}$ ${{\overset{.}{x}\left( t_{k} \right)} = \frac{{x\left( t_{k} \right)} - {x\left( t_{k - 1} \right)}}{dt}},$ or ${\overset{.}{x}\left( t_{k} \right)} = {\frac{{x\left( t_{k + 1} \right)} - {x\left( t_{k - 1} \right)}}{2{dt}}.}$ Further, the quantities proportional to numerical derivatives may be obtained using the following expressions: {dot over (x)}(t _(k))∝x(t _(k+1))−x(t _(k)), {dot over (x)}(t _(k))∝x(t _(k))−x(t _(k−1)), or {dot over (x)}(t _(k))∝x(t _(k+1))−x(t _(k−1)).  (11)

The detailed description of the invention is organized as follows.

Section 1 (“Analog Intermittently Nonlinear Filters for Mitigation of Outlier Noise”) outlines the general idea of employing intermittently nonlinear filters for mitigation of outlier (e.g. impulsive) noise, and thus improving the performance of a communications receiver in the presence of such noise. E.g., § 1.1 (“Motivation and simplified system model”) describes a simplified diagram of improving receiver performance in the presence of impulsive interference.

Section 2 (“Analog Blind Adaptive Intermittently Nonlinear Filters (ABAINFs) with the desired behavior”) introduces a practical approach to constructing analog nonlinear filters with the general behavior outlined in Section 1, and § 2.1 (“A particular ABAINF example”) provides a particular ABAINF example. Another particular ABAINF example, with the influence function of a type shown in panel (iii) of FIG. 4 , is given in § 2.2 (“Clipped Mean Tracking Filter (CMTF)”), and § 2.3 (“Illustrative CMTF circuit”) provides a simplified illustration of implementing a CMTF by solving equation (17) in an electronic circuit. Further, § 2.4 (“Using CMTFs for separating impulsive (outlier) and non-impulsive signal components with overlapping frequency spectra: Analog Differential Clippers (ADiCs)”) introduces an Analog Differential Clipper (ADiC), and § 2.5 (“Numerical implementations of ABAINFs/CMTFs/ADiCs”) provides an example of a numerical ADiC algorithm and outlines its hardware implementation.

Section 3 (“Quantile tracking filters as robust means to establish the ABAINF transparency range(s)”) introduces quantile tracking filters that may be employed as robust means to establish the ABAINF transparency range(s), with § 3.1 (“Median Tracking Filter”) discussing the tracking filter for the 2nd quartile (median), and § 3.2 (“Quartile Tracking Filters”) describing the tracking filters for the 1st and 3rd quartiles. Further, § 3.3 (“Numerical implementations of ABAINFs/CMTFs/ADiCs using quantile tracking filters as robust means to establish the transparency range”) provides an illustration of using numerical implementations of quantile tracking filters as robust means to establish the transparency range in digital embodiments of ABAINFs/CMTFs/ADiCs, and § 3.4 (“Adaptive influence function design”) comments on an adaptive approach to constructing ADiC influence functions.

Section 4 (“Adaptive intermittently nonlinear analog filters for mitigation of outlier noise in the process of analog-to-digital conversion”) illustrates analog-domain mitigation of outlier noise in the process of analog-to-digital (A/D) conversion that may be performed by deploying an ABAINF (for example, a CMTF) ahead of an ADC.

While § 4 illustrates mitigation of outlier noise in the process of analog-to-digital conversion by ADiCs/CMTFs deployed ahead of an ADC, Section 5 (“ΔΣ ADC with CMTF-based loop filter”) discusses incorporation of CMTF-based outlier noise filtering of the analog input signal into loop filters of ΔΣ analog-to-digital converters.

While § 5 describes CMTF-based outlier noise filtering of the analog input signal incorporated into loop filters of ΔΣ analog-to-digital converters, the high raw sampling rate (e.g. the flip-flop clock frequency) of a ΔΣ ADC (e.g. two to three orders of magnitude larger than the bandwidth of the signal of interest) may be used for effective ABAINF/CMTF/ADiC-based outlier filtering in the digital domain, following a ΔΣ modulator with a linear loop filter. This is discussed in Section 6 (“ΔΣ ADCs with linear loop filters and digital ADiC/CMTF filtering”).

Section 7 (“ADiC variants”) describes several alternative ADiC structures, and § 7.1 (“Robust filters”) comments of various means to establish robust local measures of location (e.g. central tendency) that may be used to establish ADiC differential clipping levels. In particular, § 7.1.1 (“Trimean Tracking Filter (TTF)”) describes a Trimean Tracking Filter (TTF) as one of such means.

Section 8 (“Simplified ADiC structure”) and § 8.1 (“Cascaded ADiC structures”) describe simplified ADiC structures that may be a preferred way to implement ADiC-based filtering due to their simplicity and robustness.

Section 9 (“ADiC-based filtering of complex-valued signals”) discusses ADiC-based filtering of complex-valued signals.

Section 10 (“Hidden outlier noise and its mitigation”) discusses how out-of-band observation of outlier noise enables its efficient in-band mitigation (in § 10.1 (“‘Outliers’ vs. ‘outlier noise’”) and § 10.2 (“‘Excess band’ observation for in-band mitigation”)), and describes the Complementary ADiC Filtering (CAF) structure (in § 10.3 (“Complementary ADiC Filter (CAF)”)).

Section 11 (“Explanatory comments and discussion”) provides several comments on the disclosure given in Sections 1 through 10, with additional details discussed in § 11.1 (“Mitigation of non-Gaussian (e.g. outlier) noise in the process of analog-to-digital conversion: Analog and digital approaches”), § 11.2 (“Comments on ΔΣ modulators”), § 11.3 (“Comparators, discriminators, clippers, and limiters”), § 11.4 (“Windowed measures of location”), § 11.5 (“Mitigation of non-impulsive non-Gaussian noise”), and § 11.6 (“Clarifying remarks”).

Penultimately, Section 12 (“Utilizing pileup effect and intermittently nonlinear filtering in synthesis of low-SNR and/or covert and hard-to-intercept communication links”) describes the use of synergistic combinations of linear and nonlinear filtering of the present invention in synthesis of low-SNR and/or secure communication links.

Finally, Section 13 (“Communicating over longer distances at lower power and energy dissipation”) addresses yet another object of the present invention, which is data communications and, in particular, communicating over longer distances at lower power and energy dissipation.

1 Analog Intermittently Nonlinear Filters for Mitigation of Outlier Noise

In the simplified illustration that follows, our focus is not on providing precise definitions and rigorous proof of the statements and assumptions, but on outlining the general idea of employing intermittently nonlinear filters for mitigation of outlier (e.g. impulsive) noise, and thus improving the performance of a communications receiver in the presence of such noise.

1.1 Motivation and Simplified System Model

Let us assume that the input noise affecting a baseband signal of interest with unit power consists of two additive components: (i) a Gaussian component with the power P_(G) in the signal passband, and (ii) an outlier (impulsive) component with the power P_(i) in the signal passband. Thus if a linear antialiasing filter is used before the analog-to-digital conversion (ADC), the resulting signal-to-noise ratio (SNR) may be expressed as (P_(G)+P_(i))⁻¹.

For simplicity, let us further assume that the outlier noise is white and consists of short (with the characteristic duration much smaller than the reciprocal of the bandwidth of the signal of interest) random pulses with the average inter-arrival times significantly larger than their duration, yet significantly smaller than the reciprocal of the signal bandwidth. When the bandwidth of such noise is reduced to within the baseband by linear filtering, its distribution would be well approximated by Gaussian [43]. Thus the observed noise in the baseband may be considered Gaussian, and we may use the Shannon formula [44] to calculate the channel capacity.

Let us now assume that we use a nonlinear antialiasing filter such that it behaves linearly, and affects the signal and noise proportionally, when the baseband power of the impulsive noise is smaller than a certain fraction of that of the Gaussian component, P_(i)≤εP_(G) (ε≥0) resulting in the SNR (P_(G)+P_(i))⁻¹. However, when the baseband power of the impulsive noise increases beyond EPG, this filter maintains its linear behavior with respect to the signal and the Gaussian noise component, while limiting the amplitude of the outlier noise in such a way that the contribution of this noise into the baseband remains limited to εP_(G)<P_(i). Then the resulting baseband SNR would be [(1+ε)P_(G)]⁻¹>(P_(G)+P_(i))⁻¹. We may view the observed noise in the baseband as Gaussian, and use the Shannon formula to calculate the limit on the channel capacity.

As one may see from this example, by disproportionately affecting high-amplitude outlier noise while otherwise preserving linear behavior, such nonlinear antialiasing filter would provide resistance to impulsive interference, limiting the effects of the latter, for small ε, to an insignificant fraction of the Gaussian noise. FIG. 2 illustrates this with a simplified diagram of improving receiver performance in the presence of impulsive interference by employing such analog nonlinear filter before the ADC. In this illustration, ε=0.2.

2 Analog Blind Adaptive Intermittently Nonlinear Filters (ABAINFs) with the Desired Behavior

The analog nonlinear filters with the behavior outlined in § 1.1 may be constructed using the approach shown in FIG. 3 , which provides an illustrative block diagram of an Analog Blind Adaptive Intermittently Nonlinear Filter (ABAINF).

In FIG. 3 , the influence function [45]

(x) is represented as

(x)=x

(x), where

(x) is a transparency function with the characteristic transparency range [α⁻, α₊]. We may require that

(x) is effectively (or approximately) unity for α⁻≤x≤α₊, and that

(|x|) becomes smaller than unity (e.g. decays to zero) for x outside of the range [α⁻, α₊].

As one should be able to see in FIG. 3 , a (nonlinear) differential equation relating the input x(t) to the output χ(t) of an ABAINF may be written as

$\begin{matrix} {{{\frac{d}{dt}\chi} = {{\frac{1}{\tau}{\mathcal{I}_{\alpha_{-}}^{\alpha_{+}}\left( {x - \chi} \right)}} = {\frac{x - \chi}{\tau}{\mathcal{T}_{\alpha_{-}}^{\alpha_{+}}\left( {x - \chi} \right)}}}},} & (12) \end{matrix}$ where τ is the ABAINF's time parameter (or time constant).

One skilled in the art will recognize that, according to equation (12), when the difference signal x(t)−χ(t) is within the transparency range [α⁻,α₊], the ABAINF would behave as a 1st order linear lowpass filter with the 3 dB corner frequency 1/(2πτ), and, for a sufficiently large transparency range, the ABAINF would exhibit nonlinear behavior only intermittently, when the difference signal extends outside the transparency range.

If the transparency range [α⁻, α₊] is chosen in such a way that it excludes outliers of the difference signal x(t)−χ(t), then, since the transparency function

(x) decreases (e.g. decays to zero) for x outside of the range [α⁻, α₊], the contribution of such outliers to the output χ(t) would be depreciated.

It may be important to note that outliers would be depreciated differentially, that is, based on the difference signal x(t)−χ(t) and not the input signal x(t).

The degree of depreciation of outliers based on their magnitude would depend on how rapidly the transparency function

(x) decreases (e.g. decays to zero) for x outside of the transparency range. For example, as follows from equation (12), once the transparency function decays to zero, the output χ(t) would maintain a constant value until the difference signal x(t)−χ(t) returns to within non-zero values of the transparency function.

FIG. 4 provides several illustrative examples of the transparency functions and their respective influence functions.

Note that panel (viii) in FIG. 4 provides an example of unbounded influence function, when the respective transparency function may not decay to zero,

$\begin{matrix} {\mathcal{I}_{\alpha} = {{x{\mathcal{T}_{\alpha}(x)}} = {x \times \left\{ {\begin{matrix} 1 & {{{for}{❘x❘}} \leq \alpha} \\ \varepsilon & {otherwise} \end{matrix},} \right.}}} & (13) \end{matrix}$ where ε≤0. Also note that for the particular influence function shown in panel (viii) of FIG. 4 the ABAINF's behavior outside the transparency range will be linear, albeit different from the behavior when the difference signal x(t)−χ(t) is within the transparency range [α⁻, α₊].

One skilled in the art will recognize that a transparency function with multiple transparency ranges may also be constructed as a product of (e.g. cascaded) transparency functions, wherein each transparency function is characterized by its respective transparency range.

2.1 A Particular ABAINF Example

As an example, let us consider a particular ABAINF with the influence function of a type shown in panel (iii) of FIG. 4 , for a symmetrical transparency range [α⁻, α₊]=[−α, α]:

$\begin{matrix} {\mathcal{I}_{\alpha} = {{x{\mathcal{T}_{\alpha}(x)}} = {x \times \left\{ {\begin{matrix} 1 & {{{for}{❘x❘}} \leq \alpha} \\ \frac{\mu\tau}{❘x❘} & {otherwise} \end{matrix},} \right.}}} & (14) \end{matrix}$ where α≥0 is the resolution parameter (with units “amplitude”), τ≥0 is the time parameter (with units “time”), and μ≥0 is the rate parameter (with units “amplitude per time”).

For such an ABAINF, the relation between the input signal x(t) and the filtered output signal χ(t) may be expressed as

$\begin{matrix} {{\overset{.}{\chi} = {\frac{x - \chi}{\tau}\left\lbrack {{\theta\left( {\alpha - {❘{x - \chi}❘}} \right)} + {\frac{\mu\tau}{❘{x - \chi}❘}{\theta\left( {{❘{x - \chi}❘} - \alpha} \right)}}} \right\rbrack}},} & (15) \end{matrix}$ where θ(x) is the Heaviside unit step function [30].

Note that when |x−χ|≤α (e.g., in the limit α→∞) equation (15) describes a 1st order analog linear lowpass filter (RC integrator) with the time constant τ (the 3 dB corner frequency 1/(2πτ)). When the magnitude of the difference signal |x−χ| exceeds the resolution parameter α, however, the rate of change of the output would be limited to the rate parameter μ and would no longer depend on the magnitude of the incoming signal x(t), providing a robust output (i.e. an output insensitive to outliers with a characteristic amplitude determined by the resolution parameter α). Note that for a sufficiently large α this filter would exhibit nonlinear behavior only intermittently, in response to noise outliers, while otherwise acting as a 1st order linear lowpass filter.

Further note that for μ=α/τ equation (15) corresponds to the Canonical Differential Limiter (CDL) described in [9, 10, 24, 32], and in the limit α→0 it corresponds to the Median Tracking Filter described in § 3.1.

However, an important distinction of this ABAINF from the nonlinear filters disclosed in [9, 10, 24, 32] would be that the resolution and the rate parameters are independent from each other. This may provide significant benefits in performance, ease of implementation, cost reduction, and in other areas, including those clarified and illustrated further in this disclosure.

2.2 Clipped Mean Tracking Filter (CMTF)

The blanking influence function shown in FIG. 4(i) would be another particular example of the ABAINF outlined in FIG. 3 , where the transparency function may be represented as a boxcar function,

$\begin{matrix} {{\mathcal{T}_{\alpha_{-}}^{\alpha_{+}}(x)} = {{\theta\left( {x - \alpha_{-}} \right)} - {{\theta\left( {x - \alpha_{+}} \right)}.}}} & (16) \end{matrix}$

For this particular choice, the ABAINF may be represented by the following 1st order nonlinear differential equation:

$\begin{matrix} {{{\frac{d}{dt}\chi} = {\frac{1}{\tau}{\mathcal{B}_{\alpha_{-}}^{\alpha_{+}}\left( {x - \chi} \right)}}},} & (17) \end{matrix}$ where the blanking function

_(α−) ^(α+)(x) may be defined as

$\begin{matrix} {{\mathcal{B}_{\alpha_{-}}^{\alpha_{+}}(x)} = \left\{ {\begin{matrix} x & {{{for}\alpha_{-}} \leq x \leq \alpha_{+}} \\ 0 & {otherwise} \end{matrix},} \right.} & (18) \end{matrix}$ and where [α⁻, α₊] may be called the blanking range.

We shall call an ABAINF with such influence function a 1st order Clipped Mean Tracking Filter (CMTF).

A block diagram of a CMTF is shown in FIG. 5 (a). In this figure, the blanker implements the blanking function

_(α−) ^(α+)(x).

In a similar fashion, we may call a circuit implementing an influence function

_(α−) ^(α+)(x) a depreciator with characteristic depreciation (or transparency, or influence) range [α⁻, α₊].

Note that, for b>0,

$\begin{matrix} {{{b^{- 1}{\mathcal{I}_{\alpha_{-}}^{\alpha_{+}}({bx})}} = {\mathcal{I}_{\frac{\alpha_{-}}{b}}^{\frac{\alpha_{+}}{b}}(x)}},} & (19) \end{matrix}$ and thus, if the blanker with the range [V⁻, V₊] is preceded by a gain stage with the gain G and followed by a gain stage with the gain G⁻¹, its apparent (or “equivalent”) blanking range would be [V⁻, V₊]/G, and would no longer be hardware limited. Thus control of transparency ranges of practical ABAINF implementations may be performed by automatic gain control (AGC) means. This may significantly simplify practical implementations of ABAINF circuits (e.g. by allowing constant hardware settings for the transparency ranges). This is illustrated in FIG. 5 (b) for the CMTF circuit.

FIG. 6 illustrates resistance of a CMTF (with a symmetrical blanking range [−α, α]) to outlier noise, in comparison with a 1st order linear lowpass filter with the same time constant (panel (a)), and with the CDL with the resolution parameter α and τ₀=τ (panel (b)). The cross-hatched time intervals in the lower panel (panel (c)) correspond to nonlinear CMTF behavior (zero rate of change of the output). Note that the clipping (i.e. zero rate of change of the CMTF output) is performed differentially, based on the magnitude of the difference signal x(t)−χ(t) and not that of the input signal x(t).

We may call the difference between a filter output when the input signal is affected by impulsive noise and an “ideal” output (in the absence of impulsive noise) an “error signal”. Then the smaller the error signal, the better the impulsive noise suppression. FIG. 7 illustrates differences in the error signal for the example of FIG. 6 . The cross-hatched time intervals indicate nonlinear CMTF behavior (zero rate of change).

2.3 Illustrative CMTF Circuit

FIG. 8 provides a simplified illustration of implementing a CMTF by solving equation (17) in an electronic circuit.

FIG. 9 provides an illustration of resistance of the CMTF circuit of FIG. 8 to outlier noise. The cross-hatched time intervals in the lower panel correspond to nonlinear CMTF behavior.

While FIG. 8 illustrates implementation of a CMTF in an electronic circuit comprising discrete components, one skilled in the art will recognize that the intended electronic functionality may be implemented by discrete components mounted on a printed circuit board, or by a combination of integrated circuits, or by an application-specific integrated circuit (ASIC). Further, one skilled in the art will recognize that a variety of alternative circuit topologies may be developed and/or used to implement the intended electronic functionality.

2.4 Using CMTFs for Separating Impulsive (Outlier) and Non-Impulsive Signal Components with Overlapping Frequency Spectra: Analog Differential Clippers (ADiCs)

In some applications it may be desirable to separate impulsive (outlier) and non-impulsive signal components with overlapping frequency spectra in time domain.

Examples of such applications would include radiation detection applications, and/or dual function systems (e.g. using radar as signal of opportunity for wireless communications and/or vice versa).

Such separation may be achieved by using sums and/or differences of the input and the output of a CMTF and its various intermediate signals. This is illustrated in FIG. 10 .

In this figure, the difference between the input to the CMTF integrator (signal τ{dot over (χ)}(t) at point III) and the CMTF output may be designated as a prime output of an Analog Differential Clipper (ADiC) and may be considered to be a non-impulsive (“background”) component extracted from the input signal. Further, the signal across the blanker (i.e. the difference between the blanker input x(t)−χ(t) and the blanker output τ{dot over (χ)}(t)) may be designated as an auxiliary output of an ADiC and may be considered to be an impulsive (outlier) component extracted from the input signal.

FIG. 11 illustrates using a CMTF with an appropriately chosen blanking range for separating impulsive and non-impulsive (“background”) signal components. Note that the sum of the prime and the auxiliary ADiC outputs would be effectively identical to the input signal, and thus the separation of impulsive and non-impulsive components may be achieved without reducing signal's bandwidth.

FIG. 12 provides illustrative block diagrams of an ADiC with time parameter τ and blanking range [α⁻, α₊]. In the figure, x(t) is the ADiC input, and y(t) is the (“prime”) ADiC output. We may call the “intermediate” signal χ(t) (the CMTF output) the Differential Clipping Level, and the blanker input is the “difference signal” x(t)−χ(t). The blanker output equals to its input if it falls within the blanking range [α⁻, α₊]. Otherwise, this output is zero.

For a robust (i.e insensitive to outliers) blanking range [α⁻, α₊] around the difference signal, the portion of the difference signal that protrudes from this range may be identified as an outlier. As may be seen in FIG. 12 , when the blanker's output is zero (that is, an outlier is encountered), χ(t) would be maintained at its previous level. As the result, in the ADiC's output the outliers would be replaced by the Differential Clipping Level χ(t), otherwise the signal would not be affected.

FIG. 13 provides a simplified illustrative electronic circuit diagram of using a CMTF/ADiC with an appropriately chosen blanking range [α⁻,α₊] for separating incoming signal x(t) into impulsive i(t) and non-impulsive s(t) (“background”) signal components, and FIG. 14 provides an illustration of such separation by the circuit of FIG. 13 .

Note that while a blanker used in the ADiC shown in FIG. 12 , a depreciator described by a different transparency function (e.g. one of those shown in FIG. 4 ) may be used. In such a case, the ADiC output may be given by the following equation:

$\begin{matrix} \left\{ {\begin{matrix} {{{\mathcal{y}}(t)} = {{\chi(t)} + {\tau{\overset{.}{\chi}(t)}}}} \\ {{\overset{.}{\chi}(t)} = {\frac{1}{\tau}{\mathcal{T}_{\alpha_{-}}^{\alpha_{+}}\left( {{x(t)} - {\chi(t)}} \right)}}} \end{matrix}.} \right. & (20) \end{matrix}$

As may be seen from equation (20), when the difference signal x(t)−χ(t) is within the transparency range [α⁻,α₊], then the ADiC output y(t) equals to its input x(t) (y(t)=χ(t)+[x(t)−χ(t)]=x(t)). However, when the difference signal is outside the transparency range (i.e an outlier is detected), the value of the transparency function is smaller then zero (for example, it is ε<1) and thus

(x(t)−χ(t))=ε[x(t)−χ(t)] and the outlier is depreciated (e.g. in the ADiC output the outlier is replaced by y(t)=x(t)+ε[x(t)−χ(t)]).

2.5 Numerical Implementations of ABAINFs/CMTFs/ADiCs

Even though an ABAINF is an analog filter by definition, it may be easily implemented digitally, for example, in a Field Programmable Gate Array (FPGA) or software. A digital ABAINF would require very little memory and would be typically inexpensive computationally, which would make it suitable for real-time implementations.

An example of a numerical algorithm implementing a finite-difference version of a CMTF/ADiC may be given by the following MATLAB function:

function [chi,prime,aux] = CMTF_ADiC(x,t,tau,alpha_p,alpha_m)  chi = zeros(size(x));  aux = zeros(size(x));  prime = zeros(size(x));  dt = diff(t);  chi(1) = x(1);  B = 0;  for i = 2:length(x);   dX = x(i) − chi(i−1);   if dX>alpha_p(i−1)    B = 0;   elseif dX<alpha_m(i−1)    B = 0;   else    B = dX;   end   chi(i) = chi(i−1) + B/(tau+dt(i−1))*dt(i−1); % numerical antiderivative   prime(i) = B + chi(i−1);   aux(i) = dX − B;  end return

In this example, “x” is the input signal, “t” is the time array, “tau” is the CMTF's time constant, “alpha_p” and “alpha_m” are the upper and the lower, respectively, blanking values, “chi” is the CMTF's output, “aux” is the extracted impulsive component (auxiliary ADiC output), and “prime” is the extracted non-impulsive (“background”) component (prime ADiC output).

Note that we retain, for convenience, the abbreviations “ABAINF” and/or “ADiC” for finite-difference (digital) ABAINF and/or ADiC implementations.

FIG. 15 provides an illustration of separation of a discrete input signal “x” into an impulsive component “aux” and a non-impulsive (“background”) component “prime” using the above MATLAB function with appropriately chosen blanking values “alpha_p” and “alpha_m”.

A digital signal processing apparatus performing an ABAINF filtering function transforming an input signal into an output filtered signal would comprise an influence function characterized by a transparency range and operable to receive an influence function input and to produce an influence function output, and an integrator function characterized by an integration time constant and operable to receive an integrator input and to produce an integrator output, wherein said integrator output is proportional to a numerical antiderivative of said integrator input.

A hardware implementation of a digital ABAINF/CMTF/ADiC filtering function may be achieved by various means including, but not limited to, general-purpose and specialized microprocessors (DSPs), microcontrollers, FPGAs, ASICs, and ASSPs. A digital or a mixed-signal processing unit performing such a filtering function may also perform a variety of other similar and/or different functions.

3 Quantile Tracking Filters as Robust Means to Establish the ABAINF Transparency Range(s)

Let y(t) be a quasi-stationary signal with a finite interquartile range (IQR), characterized by an average crossing rate)

ƒ

the threshold equal to some quantile q, 0<q<1, of y(t). (See [33, 34] for discussion of quantiles of continuous signals, and [46, 47] for discussion of threshold crossing rates.) Let us further consider the signal Q_(q)(t) related to y(t) by the following differential equation:

$\begin{matrix} {{{\frac{d}{dt}Q_{q}} = {\frac{A}{T}\left\lbrack {{{sgn}\left( {{\mathcal{y}} - Q_{q}} \right)} + {2q} - 1} \right\rbrack}},} & (21) \end{matrix}$ where A is a parameter with the same units as y and Q_(q), and T is a constant with the units of time. According to equation (21), Q_(q)(t) is a piecewise-linear signal consisting of alternating segments with positive (2qA/T) and negative (2(q−1)A/T) slopes. Note that Q_(q)(t)≈const for a sufficiently small A/T (e.g., much smaller than the product of the IQR and the average crossing rate

ƒ

of y(t) and its qth quantile), and a steady-state solution of equation (21) can be written implicitly as

$\begin{matrix} {{\overset{\_}{\theta\left( {Q_{q} - {\mathcal{y}}} \right)} \approx q},} & (22) \end{matrix}$ where θ(x) is the Heaviside unit step function [30] and the overline denotes averaging over some time interval ΔT>>

ƒ

⁻¹. Thus Q_(q) would approximate the qth quantile of y(t) [33, 34] in the time interval ΔT.

We may call an apparatus (e.g. an electronic circuit) effectively implementing equation (21) a Quantile Tracking Filter.

Despite its simplicity, a circuit implementing equation (21) may provide robust means to establish the ABAINF transparency range(s) as a linear combination of various quantiles of the difference signal (e.g. its 1st and 3rd quartiles and/or the median). We will call such a circuit for q=½ a Median Tracking Filter (MTF), and for q=¼ and/or q=¾—a Quartile Tracking Filter (QTF).

FIG. 16 provides an illustrative block diagram of a circuit implementing equation (21) and thus tracking a q th quantile of y(t). As one may see in the figure, the difference between the input y(t) and the quantile output Q_(q)(t) forms the input to an analog comparator which implements the function Asgn (y(t)−Q_(q)(t)). In reference to FIG. 16 , we may call the term (2q−1)A added to the integrator input as the “quantile setting signal”. A sum of the comparator output and the quantile setting signal forms the input of an integrator characterized by the time constant T, and the output of the integrator forms the quantile output Q_(q)(t).

3.1 Median Tracking Filter

Let x(t) be a quasi-stationary signal characterized by an average crossing rate

ƒ

of the threshold equal to the second quartile (median) of x(t). Let us further consider the signal Q₂(t) related to x(t) by the following differential equation:

$\begin{matrix} {{{\frac{d}{dt}Q_{2}} = {\frac{A}{T}{{sgn}\left( {x - Q_{2}} \right)}}},} & (23) \end{matrix}$ where A is a constant with the same units as x and Q₂, and T is a constant with the units of time. According to equation (23), Q₂(t) is a piecewise-linear signal consisting of alternating segments with positive (A/T) and negative (−A/T) slopes. Note that Q₂(t)≈const for a sufficiently small A/T (e.g., much smaller than the product of the interquartile range and the average crossing rate

ƒ

of x(t) and its second quartile), and a steady-state solution of equation (23) may be written implicitly as

$\begin{matrix} {{\overset{\_}{\theta\left( {Q_{2} - x} \right)} \approx \frac{1}{2}},} & (24) \end{matrix}$ where the overline denotes averaging over some time interval ΔT>>

ƒ

⁻¹. Thus Q₂ approximates the second quartile of x(t) in the time interval ΔT, and equation (23) describes a Median Tracking Filter (MTF). FIG. 17 illustrates the MTF's convergence to the steady state for different initial conditions.

3.2 Quartile Tracking Filters

Let y(t) be a quasi-stationary signal with a finite interquartile range (IQR), characterized by an average crossing rate

ƒ

of the threshold equal to the third quartile of y(t). Let us further consider the signal Q₃(t) related to y(t) by the following differential equation:

$\begin{matrix} {{{\frac{d}{dt}Q_{3}} = {\frac{A}{T}\left\lbrack {{{sgn}\left( {{\mathcal{y}} - Q_{3}} \right)} + \frac{1}{2}} \right\rbrack}},} & (25) \end{matrix}$ where A is a constant (with the same units as y and Q₃), and T is a constant with the units of time. According to equation (25), Q₃(t) is a piecewise-linear signal consisting of alternating segments with positive (3A/(2T)) and negative (−A/(2T)) slopes. Note that Q₃(t)≈const for a sufficiently small A/T (e.g., much smaller than the product of the IQR and the average crossing rate

ƒ

of y(t) and its third quartile), and a steady-state solution of equation (25) may be written implicitly as

$\begin{matrix} {{\overset{\_}{\theta\left( {Q_{3} - {\mathcal{y}}} \right)} \approx \frac{3}{4}},} & (26) \end{matrix}$ where the overline denotes averaging over some time interval ΔT>>

ƒ

⁻¹. Thus Q₃ approximates the third quartile of y(t) [33, 34] in the time interval ΔT.

Similarly, for

$\begin{matrix} {{\overset{\_}{\theta\left( {Q_{1} - {\mathcal{y}}} \right)} \approx \frac{1}{4}},} & (28) \end{matrix}$ a steady-state solution may be written as

$\begin{matrix} {{\frac{d}{dt}Q_{1}} = {\frac{A}{T}\left\lbrack {{{sgn}\left( {{\mathcal{y}} - Q_{1}} \right)} - \frac{1}{2}} \right\rbrack}} & (27) \end{matrix}$ and thus Q₁ would approximate the first quartile of y(t) in the time interval ΔT.

FIG. 18 illustrates the QTFs' convergence to the steady state for different initial conditions.

One skilled in the art will recognize that (1) similar tracking filters may be constructed for other quantiles (such as, for example, terciles, quintiles, sextiles, and so on), and (2) a robust range [α⁻, α₊] that excludes outliers may be constructed in various ways, as, for example, a linear combination of various quantiles.

3.3 Numerical Implementations of ABAINFs/CMTFs/ADiCs Using Quantile Tracking Filters as Robust Means to Establish the Transparency Range

For example, an ABAINF/CMTF/ADiC with an adaptive (possibly asymmetric) transparency range [α⁻, α₊] may be designed as follows. To ensure that the values of the difference signal x(t)−χ(t) that lie outside of [α⁻, α₊] are outliers, one may identify [α⁻, α₊] with Tukey's range [48], a linear combination of the 1st (Q₁) and the 3rd (Q₃) quartiles of the difference signal: [α⁻,α₊]=[Q ₁−β(Q ₃ −Q ₁),Q ₃+β(Q ₃ −Q ₁)],  (29) where β is a coefficient of order unity (e.g. β=1.5).

An example of a numerical algorithm implementing a finite-difference version of a CMTF/ADiC with the blanking range computed as Tukey's range of the difference signal using digital QTFs may be given by the MATLAB function “CMTF_ADiC_alpha” below.

In this example, the CMTF/ADiC filtering function further comprises a means of tracking the range of the difference signal that effectively excludes outliers of the difference signal, and wherein said means comprises a QTF estimating a quartile of the difference signal:

function [chi,prime,aux,alpha_p,alpha_m] = CMTF_ADiC_alpha(x,t,tau,beta,mu)   chi = zeros(size(x));   aux = zeros(size(x));   prime = zeros(size(x));   alpha_p = zeros(size(x));   alpha_m = zeros(size(x));   dt = diff(t);   chi(1) = x(1);   Q1 = x(1);   Q3 = x(1);   B = 0;   for i = 2:length(x);    dX = x(i) − chi(i−1);  %---------------------------------------------------------------------------------------------------------  % Update 1st and 3rd quartile values:   Q1 = Q1 + mu*(sign(dX−Q1)−0.5)*dt(i−1); % numerical antiderivative   Q3 = Q3 + mu*(sign(dX−Q3)+0.5)*dt(i−1); % numerical antiderivative  %---------------------------------------------------------------------------------------------------------  % Calculate blanking range:   alpha_p(i) = Q3 + beta*(Q3−Q1);   alpha_m(i) = Q1 − beta*(Q3−Q1);  %---------------------------------------------------------------------------------------------------------   if dX>alpha_p(i)    B = 0;   elseif dX<alpha_m(i)    B = 0;   else    B = dX;   end   chi(i) = chi(i−1) + B/(tau+dt(i−1))*dt(i−1); % numerical antiderivative   prime(i) = B + chi(i−1);   aux(i) = dX − B;   end return

FIG. 19 provides an illustration of separation of discrete input signal “x” into impulsive component “aux” and non-impulsive (“background”) component “prime” using the above MATLAB function of § 3.3 with the blanking range computed as Tukey's range using digital QTFs. The upper and lower limits of the blanking range are shown by the dashed lines in panel (b).

Since outputs of analog QTFs are piecewise-linear signals consisting of alternating segments with positive and negative slopes, a care should be taken in finite difference implementations of QTFs when y(n)−Q_(q)(n−1) is outside of the interval hA[2(q−1), 2q]/T, where h is the time step. For example, in such a case one may set Q_(q)(n)=y(n), as illustrated in the example below.

function [xADiC,xCMTF,resid,alpha_p,alpha_m]=ADiC_IQRscaling(x,dt,tau,beta,mu)  Ntau = (1+floor(tau/dt));  xADiC = zeros(size(x)); xCMTF = zeros(size(x)); resid = zeros(size(x));  alpha_p = zeros(size(x)); alpha_m = zeros(size(x)); gamma = mu*dt;  xADiC(1) = x(1); xCMTF(1) = x(1); Balphapm = 0; Q1 = x(1); Q3 = x(1);  for i = 2:length(x);   dX = x(i)−xCMTF(i−1);  %---------------------------------------------------------------------------------------------------  % Update 1st and 3rd quartile values:   dX3 = dX − Q3;   if dX3 > −gamma/2 & dX3 < 3*gamma/2    Q3 = dX;   else    Q3 = Q3 + gamma*(sign(dX3)+0.5);   end   dX1 = dX − Q1;   if dX1 > −3*gamma/2 & dX1 < gamma/2    Q1 = dX;   else    Q1 = Q1 + gamma*(sign(dX1)−0.5);   end  %---------------------------------------------------------------------------------------------------  % Calculate blanking range:   alpha_p(i) = Q3 + beta*(Q3−Q1); alpha_m(i) = Q1 − beta*(Q3−Q1);  %---------------------------------------------------------------------------------------------------   M = (Q3+Q1)/2; R = (1+2*beta)*(Q3−Q1)/2;   if dX>alpha_p(i)+1e−12    Balphapm = dX*(R/(dX−M)){circumflex over ( )}2;   elseif dX<alpha_m(i)−1e−12    Balphapm = dX*(R/(dX−M)){circumflex over ( )}2;   else    Balphapm = dX;   end   xCMTF(i) = xCMTF(i−1) + Balphapm/Ntau;   xADiC(i) = Balphapm + xCMTF(i−1); resid(i) = dX − Balphapm;  end  return

Note that in this example the following transparency function is used:

$\begin{matrix} {{\mathcal{T}_{\alpha_{-}}^{\alpha_{+}}(x)} = \left\{ {\begin{matrix} 1 & {\left. {for}\alpha \right.\_ \leq x \leq \alpha_{+}} \\ \left( \frac{\mathcal{R}}{x - \mathcal{M}} \right)^{2} & {otherwise} \end{matrix},} \right.} & (30) \end{matrix}$ where

$\mathcal{R} = {{\frac{\alpha_{+} - \alpha_{-}}{2}{and}\mathcal{M}} = {\frac{\alpha_{+} + \alpha_{-}}{2}.}}$ This transparency function is illustrated in FIG. 20 .

3.4 Adaptive Influence Function Design

The influence function choice determines the structure of the local nonlinearity imposed on the input signal. If the distribution of the non-Gaussian technogenic noise is known, then one may invoke the classic locally most powerful (LMP) test [49] to detect and mitigate the noise. The LMP test involves the use of local nonlinearity whose optimal choice corresponds to

${{{\mathcal{g}}_{lo}(n)} = {- \frac{f^{\prime}(n)}{f(n)}}},$ where ƒ(n) represents the technogenic noise density function and ƒ′(n) is its derivative. While the LMP test and the local nonlinearity is typically applied in the discrete time domain, the present invention enables the use of this idea to guide the design of influence functions in the analog domain. Additionally, non-stationarity in the noise distribution may motivate an online adaptive strategy to design influence functions.

Such adaptive online influence function design strategy may explore the methodology disclosed herein. In order to estimate the influence function, one may need to estimate both the density and its derivative of the noise. Since the difference signal x(t)−χ(t) of an ABAINF would effectively represent the non-Gaussian noise affecting the signal of interest, one may use a bank of N quantile tracking filters described in § 3 to determine the sample quantiles (Q₁, Q₂, . . . , Q_(N)) of the difference signal. Then one may use a non-parametric regression technique such as, for example, a local polynomial kernel regression strategy to simultaneously estimate (1) the time-dependent amplitude distribution function Φ(D, t) of the difference signal, (2) its density function ϕ(D, t), and (3) the derivative of the density function ∂ϕ(D, t)/∂D.

4 Adaptive Intermittently Nonlinear Analog Filters for Mitigation of Outlier Noise in the Process of Analog-to-Digital Conversion

Let us now illustrate analog-domain mitigation of outlier noise in the process of analog-to-digital (A/D) conversion that may be performed by deploying an ABAINF (for example, a CMTF) ahead of an ADC.

An illustrative principal block diagram of an adaptive CMTF for mitigation of outlier noise disclosed herein is shown in FIG. 21 . Without loss of generality, here it may be assumed that the output ranges of the active components (e.g. the active filters, integrators, and comparators), as well as the input range of the analog-to-digital converter (A/D), are limited to a certain finite range, e.g., to the power supply range ±V_(c).

The time constant τ may be such that 1/(2πτ) is similar to the corner frequency of the anti-aliasing filter (e.g., approximately twice the bandwidth of the signal of interest B_(x)), and the time constant T should be two to three orders of magnitude larger than B⁻¹. The purpose of the front-end lowpass filter would be to sufficiently limit the input noise power. However, its bandwidth may remain sufficiently wide (i.e. γ>>1) so that the impulsive noise is not excessively broadened.

Without loss of generality, we may further assume that the gain K is constant (and is largely determined by the value of the parameter γ, e.g., as K˜√{square root over (γ)}), and the gains G and g are adjusted (e.g. using automatic gain control) in order to well utilize the available output ranges of the active components, and the input range of the A/D. For example, G and g may be chosen to ensure that the average absolute value of the output signal (i.e., observed at point IV) is approximately V_(c)/5, and the average value of Q₂*(t) is approximately constant and is smaller than V_(c).

4.1 CMTF Block

For the Clipped Mean Tracking Filter (CMTF) block shown in FIG. 21 , the input x(t) and the output χ(t) signals may be related by the following 1st order nonlinear differential equation:

$\begin{matrix} {{{\frac{d}{dt}\chi} = {\frac{1}{\tau}{\mathcal{B}_{\frac{V_{c}}{\mathcal{g}}}\left( {x - \chi} \right)}}},} & (31) \end{matrix}$ where the symmetrical blanking function

_(α)(x) may be defined as

$\begin{matrix} {{\mathcal{B}_{\alpha}(x)} = \left\{ {\begin{matrix} x & {{{for}{❘x❘}} \leq \alpha} \\ 0 & {otherwise} \end{matrix},} \right.} & (32) \end{matrix}$ and where the parameter α is the blanking value.

Note that for the blanking values such that |x(t)−χ(t)|≤V_(c)/g for all t, equation (31) describes a 1st order linear lowpass filter with the corner frequency 1/(2πτ), and the filter shown in FIG. 21 operates in a linear regime (see FIG. 22 ). However, when the values of the difference signal x(t)−χ(t) are outside of the interval [−V_(c)/g, V_(c)/g], the rate of change of χ(t) is zero and no longer depends on the magnitude of x(t)−χ(t). Thus, if the values of the difference signal that lie outside of the interval [−V_(c)/g, V_(c)/g] are outliers, the output χ(t) would be insensitive to further increase in the amplitude of such outliers. FIG. 6 illustrates resistance of a CMTF to outlier noise, in comparison with a 1st order linear lowpass filter with the same time constant. The shaded time intervals correspond to nonlinear CMTF behavior (zero rate of change). Note that the clipping (i.e. zero rate of change of the CMTF output) is performed differentially, based on the magnitude of the difference signal |x−χ| and not that of the input signal x.

In the filter shown in FIG. 21 the range [−V_(c)/g, V_(c)/g] that excludes outliers is obtained as Tukey's range [48] for a symmetrical distribution, with V_(c)/g given by

$\begin{matrix} {{\frac{V_{c}}{\mathcal{g}} = {\left( {1 + {2\beta}} \right)Q_{2}^{\bigstar}}},} & (33) \end{matrix}$ where Q₂ is the 2nd quartile (median) of the absolute value of the difference signal x(t)−χ(t), and where β is a coefficient of order unity (e.g. β=3). While in this example we use Tukey's range, various alternative approaches to establishing a robust interval [−V_(c)/g, V_(c)/g] may be employed.

In FIG. 21 , the MTF circuit receiving the absolute value of the blanker input and producing the MTF output, together with a means to maintain said MTF output at approximately constant value (e.g. using automatic gain control) and the gain stages preceding and following the blanker, establish a blanking range that effectively excludes outliers of the blanker input.

It would be important to note that, as illustrated in panel I of FIG. 22 , in the linear regime the CMTF would operate as a 1st order linear lowpass filter with the corner frequency 1/(2πτ). It would exhibit nonlinear behavior only intermittently, in response to outliers in the difference signal, thus avoiding the detrimental effects, such as instabilities and intermodulation distortions, often associated with nonlinear filtering.

4.2 Baseband Filter

In the absence of the CMTF in the signal processing chain, the baseband filter following the A/D would have the impulse response w[k] that may be viewed as a digitally sampled continuous-time impulse response w(t) (see panel II of FIG. 22 ). As one may see in FIG. 21 , the impulse response of this filter may be modified by adding the term τ{dot over (w)}[k], where the dot over the variable denotes its time derivative, and where {dot over (w)}[k] may be viewed as a digitally sampled continuous-time function {dot over (w)}(t). This added term would compensate for the insertion of a 1st order linear lowpass filter in the signal chain, as illustrated in FIG. 22 .

Indeed, from the differential equation for a 1st order lowpass filter it would follow that h_(τ) *(w+τ{dot over (w)})=w, where the asterisk denotes convolution and where h_(τ)(t) is the impulse response of the 1st order linear lowpass filter with the corner frequency 1/(2πτ). Thus, provided that τ is sufficiently small (e.g., τ≲1/(2πB_(aa)), where B_(aa) is the nominal bandwidth of the anti-aliasing filter), the signal chains shown in panels I and II of FIG. 22 would be effectively equivalent. The impulse and frequency responses of w[k] (a root-raised-cosine filter with the roll-off factor ¼, bandwidth 5B_(x)/4, and the sampling rate 8B_(x)) and w[k]+τ{dot over (w)}[k](with τ=1/(4πB_(x))) used in the subsequent examples of this section are shown in FIG. 23 .

4.3 Comparative Performance Examples 4.3.1 Simulation Parameters

To emulate the analog signals in the simulated examples presented below, the digitisation rate was chosen to be significantly higher (by about two orders of magnitude) than the A/D sampling rate.

The signal of interest is a Gaussian baseband signal in the nominal frequency rage [0, B_(x)]. It is generated as a broadband white Gaussian noise filtered with a root-raised-cosine filter with the roll-off factor ¼ and the bandwidth 5B_(x)/4.

The noise affecting the signal of interest is a sum of an Additive White Gaussian Noise (AWGN) background component and white impulsive noise i(t). In order to demonstrate the applicability of the proposed approach to establishing a robust interval [−V_(c)/g, V_(c)/g] for asymmetrical distributions, the impulsive noise is modelled as asymmetrical (unipolar) Poisson shot noise:

$\begin{matrix} {{{i(t)} = {{❘{v(t)}❘}{\sum\limits_{k = 1}^{\infty}{\delta\left( {t - t_{k}} \right)}}}},} & (34) \end{matrix}$ where v(t) is AWGN noise, t_(k) is the k-th arrival time of a Poisson point process with the rate parameter λ, and δ(x) is the Dirac δ-function [31]. In the examples below, λ=2B_(x).

The A/D sampling rate is 8B_(x) (that assumes a factor of 4 oversampling of the signal of interest), the A/D resolution is 12 bits, and the anti-aliasing filter is a 2nd order Butterworth lowpass filter with the corner frequency 2B_(x). Further, the range of the comparators in the QTFs is ±A=±V_(c), the time constants of the integrators are τ=1/(4πB_(x)) and T=100/B_(x). The impulse responses of the baseband filters w[k] and w[k]+τ{dot over (w)}[k] are shown in the upper panel of FIG. 23 .

The front-end lowpass filter is a 2nd order Bessel with the cutoff frequency γ/(2πτ). The value of the parameter γ is chosen as γ=16, and the gain of the anti-aliasing filter is K=√{square root over (γ)}=4. The gains G and g are chosen to ensure that the average absolute value of the output signal (i.e., observed at point IV in FIG. 21 and at point (c) in FIG. 22 ) is approximately V_(c)/5, and

${{Q_{2}^{\bigstar}(t)} \approx \frac{V_{c}}{1 + {2\beta}}} = {{const}.}$

4.3.2 Comparative Channel Capacities

For the simulation parameters described above, FIG. 24 compares the simulated channel capacities (calculated from the baseband SNRs using the Shannon formula [44]) for various signal+noise compositions, for the linear signal processing chain shown in panel II of FIG. 22 (solid curves) and the CMTF-based chain of FIG. 21 with β=3 (dotted curves).

As one may see in FIG. 24 (and compare with the simplified diagram of FIG. 2 ), for a sufficiently large β both linear and the CMTF-based chains provide effectively equivalent performance when the AWGN dominates over the impulsive noise. However, the CMTF-based chains are insensitive to further increase in the impulsive noise when the latter becomes comparable or dominates over the thermal (Gaussian) noise, thus providing resistance to impulsive interference.

Further, the dashed curves in FIG. 24 show the simulated channel capacities for the CMTF-based chain of FIG. 21 (with β=3) when additional interference in an adjacent channel is added, as would be a reasonably common practical scenario. The passband of this interference is approximately [3B_(x), 4B_(x)], and the total power is approximately 4 times (6 dB) larger that that of the signal of interest. As one may see in FIG. 24 , such interference increases the apparent blanking value needed to maintain effectively linear CMTF behaviour in the absence of the outliers, reducing the effectiveness of the impulsive noise suppression (more noticeably for higher AWGN SNRs).

It may be instructive to illustrate and compare the changes in the signal's time and frequency domain properties, and in its amplitude distributions, while it propagates through the signal processing chains, linear (points (a), (b), and (c) in panel II of FIG. 22 ), and the CMTF-based (points I through IV, and point V, in FIG. 21 ). Such an illustration is provided in FIG. 25 . In the figure, the dashed lines (and the respective cross-hatched areas) correspond to the “ideal” signal of interest (without noise and adjacent channel interference), and the solid lines correspond to the signal+noise+interference mixtures. The leftmost panels show the time domain traces, the rightmost panels show the power spectral densities (PSDs), and the middle panels show the amplitude densities. The baseband power of the AWGN is one tenth of that of the signal of interest (10 dB AWGN SNR), and the baseband power of the impulsive noise is approximately 8 times (9 dB) that of the AWGN. The value of the parameter β for Tukey's range is β=3. (These noise and adjacent channel interference conditions, and the value β=3, correspond to the respective channel capacities marked by the asterisks in FIG. 24 ).

Measure of peakedness—In the panels showing the amplitude densities, the peakedness of the signal+noise mixtures is measured and indicated in units of “decibels relative to Gaussian” (dBG). This measure is based on the classical definition of kurtosis [50], and for a real-valued signal may be expressed in terms of its kurtosis in relation to the kurtosis of the Gaussian (aka normal) distribution as follows [9, 10]:

$\begin{matrix} {{{K_{dBG}(x)} = {10{\lg\left\lbrack \frac{\left\langle \left( {x - \left\langle x \right\rangle} \right)^{4} \right\rangle}{3\left\langle \left( {x - \left\langle x \right\rangle} \right)^{2} \right\rangle^{2}} \right\rbrack}}},} & (35) \end{matrix}$ where the angular brackets denote the time averaging. According to this definition, a Gaussian distribution would have zero dBG peakedness, while sub-Gaussian and super-Gaussian distributions would have negative and positive dBG peakedness, respectively. In terms of the amplitude distribution of a signal, a higher peakedness compared to a Gaussian distribution (super-Gaussian) normally translates into “heavier tails” than those of a Gaussian distribution. In the time domain, high peakedness implies more frequent occurrence of outliers, that is, an impulsive signal.

Incoming signal—As one may see in the upper row of panels in FIG. 25 , the incoming impulsive noise dominates over the AWGN. The peakedness of the signal+noise mixture is high (14.9 dBG), and its amplitude distribution has a heavy “tail” at positive amplitudes.

Linear chain—The anti-aliasing filter in the linear chain (row (b)) suppresses the high-frequency content of the noise, reducing the peakedness to 2.3 dBG. The matching filter in the baseband (row (c)) further limits the noise frequencies to within the baseband, reducing the peakedness to 0 dBG. Thus the observed baseband noise may be considered to be effectively Gaussian, and we may use the Shannon formula [44] based on the achieved baseband SNR (0.9 dB) to calculate the channel capacity. This is marked by the asterisk on the respective solid curve in FIG. 24 . (Note that the achieved 0.9 dB baseband SNR is slightly larger than the “ideal” 0.5 dB SNR that would have been observed without “clipping” the outliers of the output of the anti-aliasing filter by the A/D at ±V_(c).)

CMTF-based chain—As one may see in the panels of row V, the difference signal largely reflects the temporal and the amplitude structures of the noise and the adjacent channel signal. Thus its output may be used to obtain the range for identifying the noise outliers (i.e. the blanking value V_(c)/g). Note that a slight increase in the peakedness (from 14.9 dBG to 15.4 dBG) is mainly due to decreasing the contribution of the Gaussian signal of interest, as follows from the linearity property of kurtosis.

As may be seen in the panels of row II, since the CMTF disproportionately affects signals with different temporal and/or amplitude structures, it reduces the spectral density of the impulsive interference in the signal passband without significantly affecting the signal of interest. The impulsive noise is notably decreased, while the amplitude distribution of the filtered signal+noise mixture becomes effectively Gaussian.

The anti-aliasing (row III) and the baseband (row IV) filters further reduce the remaining noise to within the baseband, while the modified baseband filter also compensates for the insertion of the CMTF in the signal chain. This results in the 9.3 dB baseband SNR, leading to the channel capacity marked by the asterisk on the respective dashed-line curve in FIG. 24 .

4.4 Alternative Topology for Signal Processing Chain Shown in FIG. 21

FIG. 26 provides an illustration of an alternative topology for signal processing chain shown in FIG. 21 , where the blanking range is determined according to equation (67).

One skilled in the art will recognize that the topology shown in FIG. 21 and the topology shown in FIG. 26 both comprise a CMTF filter (transforming an input signal x(t) into an output signal χ(t)) characterized by a blanking range, and a robust means to establish said blanking range in such a way that it excludes the outliers in the difference signal x(t)−χ(t).

In FIG. 26 , two QTFs receive a signal proportional to the blanker input and produce two QTF outputs, corresponding to the 1st and the 3rd quartiles of the QTF input. Then the blanking range of the blanker is established as a linear combination of these two outputs.

5 ΔΣ ADC with CMTF-Based Loop Filter

While § 4 discloses mitigation of outlier noise in the process of analog-to-digital conversion by ADiCs/CMTFs deployed ahead of an ADC, CMTF-based outlier noise filtering of the analog input signal may also be incorporated into loop filters of ΔΣ analog-to-digital converters.

Let us consider the modifications to a 2nd-order ΔΣ ADC depicted in FIG. 27 . (Note that the vertical scales of the shown fragments of the signal traces vary for different fragments.) We may assume from here on that the 1st order lowpass filters with the time constant τ and the impulse response h_(τ)(t) shown in the figure have a bandwidth (as signified by the 3 dB corner frequency) that is much larger than the bandwidth of the signal of interest B_(x), yet much smaller than the sampling (clock) frequency F_(s). For example, the bandwidth of h_(τ)(t) may be approximately equal to the geometric mean of B_(x) and F_(s), resulting in the following value for τ:

$\begin{matrix} {\tau \approx {\frac{1}{2\pi\sqrt{B_{x}F_{s}}}.}} & (36) \end{matrix}$

As one may see in FIG. 27 , the first integrator (with the time constant γτ) is preceded by a (symmetrical) blanker, where the (symmetrical) blanking function

_(α)(x) may be defined

$\begin{matrix} {{\mathcal{B}_{\alpha}(x)} = \left\{ {\begin{matrix} x & {{{for}{❘x❘}} \leq \alpha} \\ 0 & {otherwise} \end{matrix},} \right.} & (37) \end{matrix}$ and where α is the blanking value.

As shown in the figure, the input x(t) and the output y(t) may be related by

$\begin{matrix} {{{\frac{d}{dt}\overset{\_}{h_{\tau}*{\mathcal{y}}}} = {\frac{1}{\gamma\tau}\overset{\_}{\mathcal{B}_{\alpha}\left( {h_{\tau}*\left( {x - {\mathcal{y}}} \right)} \right)}}},} & (38) \end{matrix}$ where the overlines denote averaging over a time interval between any pair of threshold (including zero) crossings of D (such as, e.g., the interval ΔT shown in FIG. 27 ), and the filter represented by equation (38) may be referred to as a Clipped Mean Tracking Filter (CMTF). Note that without the time averaging equation (38) corresponds to the ABAINF described by equation (15) with μ=0, where x and χ replaced by h_(τ)*x and h_(τ)*y, respectively.

The utility of the 1st order lowpass filters h_(τ)(t) would be, first, to modify the amplitude density of the difference signal x−y so that for a slowly varying signal of interest x(t) the mean and the median values of h_(τ) *(x−y) in the time interval ΔT would become effectively equivalent, as illustrated in FIG. 28 . However, the median value of h_(τ) *(x−y) would be more robust when the narrow-band signal of interest is affected by short-duration outliers such as broadband impulsive noise, since such outliers would not be excessively broadened by the wide-band filter h_(τ)(t). In addition, while being wide-band, this filter would prevent the amplitude of the background noise observed at the input of the blanker from being excessively large.

With τ given by equation (36), the parameter γ may be chosen as

$\begin{matrix} {{\gamma \approx \frac{1}{4\pi B_{x}\tau} \approx {\frac{1}{2}\sqrt{\frac{F_{s}}{B_{x}}}}},} & (39) \end{matrix}$ and the relation between the input and the output of the ΔΣ ADCs with a CMTF-based loop filter may be expressed as x(t−Δt)≈((w+γτ{dot over (w)})*y)(t).  (40)

Note that for large blanking values such that α≥|h_(τ)*(x−y) for all t, according to equation (38) the average rate of change of h_(τ)*y would be proportional to the average of the difference signal h_(τ)*(x−y). When the magnitude of the difference signal h_(τ) *(x−y) exceeds the blanking value α, however, the average rate of change of h_(τ)*y would be zero and would no longer depend on the magnitude of h_(τ)*x, providing an output that would be insensitive to outliers with a characteristic amplitude determined by the blanking value α.

Since linear filters are generally better than median for removing broadband Gaussian (e.g. thermal) noise, the blanking value in the CMTF-based topology should be chosen to ensure that the CMTF-based ΔΣ ADC performs effectively linearly when outliers are not present, and that it exhibits nonlinear behavior only intermittently, in response to outlier noise. An example of a robust approach to establishing such a blanking value is outlined in § 5.2.

One skilled in the art will recognize that the ΔΣ modulator depicted in FIG. 27 comprises a quantizer (flip-flop), a blanker, two integrators, and two wide-bandwidth 1st order lowpass filters, and the (nonlinear) loop filter of this modulator is configured in such a way that the value of the quantized representation (signal y(t)) of the input signal x(t), averaged over a time interval ΔT comparable with an inverse of the nominal bandwidth of the signal of interest, is effectively proportional to a nonlinear measure of central tendency of said input signal x(t) in said time interval ΔT.

5.1 Simplified Performance Example

Let us first use a simplified synthetic signal to illustrate the essential features, and the advantages provided by the ΔΣ ADC with the CMTF-based loop filter configuration when the impulsive noise affecting the signal of interest dominates over a low-level background Gaussian noise.

In this example, the signal of interest consists of two fragments of two sinusoidal tones with 0.9V_(c) amplitudes, and with frequencies B_(x) and B_(x)/8, respectively, separated by zero-value segments. While pure sine waves are chosen for an ease of visual assessment of the effects of the noise, one may envision that the low-frequency tone corresponds to a vowel in a speech signal, and that the high-frequency tone corresponds to a fricative consonant.

For all ΔΣ ADCs in this illustration, the flip-flop clock frequency is F_(s)=NB_(x), where N=1024. For the 2nd-order loop filter in this illustration τ=(4πB_(x))⁻¹. The time constant τ of the 1st order lowpass filters in the CMTF-based loop filter is τ=(2πB_(x)√{square root over (N)})⁻¹=(64πB_(x))⁻¹, and γ=16 (resulting in γτ=(4πB_(x))⁻¹). The parameter α is chosen as α=V_(c). The output y[k] of the ΔΣ ADC with the 1st-order linear loop filter (panel I of FIG. 1 ) is filtered with a digital lowpass filter with the impulse response w[k]. The outputs of the ΔΣ ADCs with the 2nd-order linear (panel II of FIG. 1 ) and the CMTF-based (FIG. 5 ) loop filters are filtered with a digital lowpass filter with the impulse response w[k]+(4πB_(x))⁻¹{dot over (w)}[k]. The impulse and frequency responses of w[k] and w[k]+(4πB_(x))⁻¹{dot over (w)}[k] are shown in FIG. 29 .

As shown in panel I of FIG. 30 , the signal is affected by a mixture of additive white Gaussian noise (AWGN) and white impulse (outlier) noise components, both band-limited to approximately B_(x)√{square root over (N)} bandwidth. As shown in panel II, in the absence of the outlier noise, the performance of all ΔΣ ADC in this example is effectively equivalent, and the amount of the AWGN is such that the resulting signal-to-noise ratio for the filtered output is approximately 20 dB in the absence of the outlier noise. The amount of the outlier noise is such that the resulting signal-to-noise ratio for the filtered output of the ΔΣ ADC with a 1st-order linear loop filter is approximately 6 dB in the absence of the AWGN.

As one may see in panels III and IV of FIG. 30 , the linear loop filters are ineffective in suppressing the impulsive noise. Further, the performance of the ΔΣ ADC with the 2nd-order linear loop filter (see panel IV of FIG. 30 ) is more severely degraded by high-power noise, especially by high-amplitude outlier noise such that the condition |x(t−Δt)+(w*v)(t)|<V_(c) is not satisfied for all t. On the other hand, as may be seen in panel V of FIG. 30 , the ΔΣ ADC with the CMTF-based loop filter improves the signal-to-noise ratio by about 13 dB in comparison with the ΔΣ ADC with the 1st-order linear loop filter, thus removing about 95% of the impulsive noise.

More importantly, as may be seen in panel III of FIG. 31 , increasing the impulsive noise power by an order of magnitude hardly affects the output of the ΔΣ ADC with the CMTF-based loop filter (and thus about 99.5% of the impulsive noise is removed), while further exceedingly degrading the output of the ΔΣ ADC with the 1st-order linear loop filter (panel II).

5.2 ΔΣ ADC with Adaptive CMTF

A CMTF with an adaptive (possibly asymmetric) blanking range [α⁻,α₊] may be designed as follows. To ensure that the values of the difference signal h_(T)*(x−y) that lie outside of [α⁻, α₊] are outliers, one may identify [α⁻, α₊] with Tukey's range [48], a linear combination of the 1st (Q₁) and the 3rd (Q₃) quartiles of the difference signal (see [33, 34] for additional discussion of quantiles of continuous signals): [α⁻,α₊]=[Q ₁−(Q ₃ −Q ₁),Q ₃+β(Q ₃ −Q ₁)],  (41) where β is a coefficient of order unity (e.g. β=1.5). From equation (41), for a symmetrical distribution the range that excludes outliers may also be obtained as [α⁻, α₊]=[−α, α], where α is given by α=(1+2β)Q ₂*,  (42) and where Q₂* is the 2nd quartile (median) of the absolute value (or modulus) of the difference signal |h_(τ)*(x−y)|.

Alternatively, since 2Q₂*=Q₃−Q₁ for a symmetrical distribution, the resolution parameter α may be obtained as

$\begin{matrix} {{\alpha = {\left( {\frac{1}{2} + \beta} \right)\left( {Q_{3} - Q_{1}} \right)}},} & (43) \end{matrix}$ where Q₃−Q₁ is the interquartile range (IQR) of the difference signal.

FIG. 32 provides an outline of a ΔΣ ADC with an adaptive CMTF-based loop filter. In this example, the 1st order lowpass filters are followed by the gain stages with the gain G, while the blanking value is set to V_(c). Note that

$\begin{matrix} {{{\mathcal{B}_{V_{c}}({Gx})} = {G{\mathcal{B}_{\frac{V_{c}}{G}}(x)}}},} & (44) \end{matrix}$ and thus the “apparent” (or “equivalent”) blanking value would be no longer hardware limited. As shown in FIG. 32 , the input x(t) and the output y(t) may be related by

$\begin{matrix} {{\frac{d}{dt}\overset{\_}{h_{\tau}*{\mathcal{y}}}} = {\frac{1}{\gamma\tau}{\overset{\_}{\mathcal{B}_{\frac{V_{c}}{G}}\left( {h_{\tau}*\left( {x - {\mathcal{y}}} \right)} \right)}.}}} & (45) \end{matrix}$

If an automatic gain control circuit maintains a constant output −V_(c)/(1+2β) of the MTF circuit in FIG. 32 , then the apparent blanking value α=V_(c)/G in equation (45) may be given by equation (42).

5.2.1 Performance Example

Simulation parameters—To emulate the analog signals in the examples below, the digitization rate is two orders of magnitude higher than the sampling rate F_(s). The signal of interest is a Gaussian baseband signal in the nominal frequency rage [0, B_(x)]. It is generated as a broadband white Gaussian noise filtered with a root-raised-cosine filter with the roll-off factor ¼ and the bandwidth 5B_(x)/4. The noise affecting the signal of interest is a sum of an AWGN background component and white impulsive noise i(t). The impulsive noise is modeled as symmetrical (bipolar) Poisson shot noise:

$\begin{matrix} {{{i(t)} = {{v(t)}{\sum\limits_{k = 1}^{\infty}{\delta\left( {t - t_{k}} \right)}}}},} & (46) \end{matrix}$ where v(t) is AWGN noise, t_(k) is the k-th arrival time of a Poisson process with the rate parameter λ, and δ(x) is the Dirac δ-function [31]. In the examples below, λ=B_(x). The gain G is chosen to maintain the output of the MTF in FIG. 32 at −V_(c)/(1+2β), and the digital lowpass filter w[k] is the root-raised-cosine filter with the roll-off factor ¼ and the bandwidth 5B_(x)/4. The remaining hardware parameters are the same as those in § 5.1. Further, the magnitude of the input x(t) is chosen to ensure that the average absolute value of the output signal is approximately V_(c)/5.

Comparative channel capacities—For the simulation parameters described above, FIG. 33 compares the simulated channel capacities (calculated from the baseband SNRs using the Shannon formula [44]) for various signal+noise compositions, for the linear signal processing chain (solid lines) and the CMTF-based chain of FIG. 32 with β=1.5 (dotted lines).

As one may see in FIG. 33 (and compare with the simplified diagram of FIG. 2 ), linear and the CMTF-based chains provide effectively equivalent performance when the AWGN dominates over the impulsive noise. However, the CMTF-based chains are insensitive to further increase in the impulsive noise when the latter becomes comparable or dominates over the thermal (Gaussian) noise, thus providing resistance to impulsive interference.

Disproportionate effect on baseband PSDs—For a mixture of white Gaussian and white impulsive noise, FIG. 34 illustrates reduction of the spectral density of impulsive noise in the signal baseband without affecting that of the signal of interest. In the figure, the solid lines correspond to the “ideal” signal of interest (without noise), and the dotted lines correspond to the signal+noise mixtures. The baseband power of the AWGN is one tenth of that of the signal of interest (10 dB AWGN SNR), and the baseband power of the impulsive noise is approximately 8 times (9 dB) that of the AWGN. The value of the parameter β for Tukey's range is β=1.5. As may be seen in the figure, for the CMTF-based chain the baseband SNR increases from 0.5 dB to 9.7 dB.

For both the linear and the CMTF-based chains the observed baseband noise may be considered to be effectively Gaussian, and we may use the Shannon formula [44] based on the achieved baseband SNRs to calculate the channel capacities. Those are marked by the asterisks on the respective solid and dotted curves in FIG. 33 .

FIG. 35 provides a similar illustration with additional interference in an adjacent channel. Such interference increases the apparent blanking value needed to maintain effectively linear CMTF behavior in the absence of the outliers, slightly reducing the effectiveness of the impulsive noise suppression. As a result, the baseband SNR increases from 0.5 dB to only 8.5 dB.

6 ΔΣ ADCs with Linear Loop Filters and Digital ADiC/CMTF Filtering

While § 5 describes CMTF-based outlier noise filtering of the analog input signal incorporated into loop filters of ΔΣ analog-to-digital converters, the high raw sampling rate (e.g. the flip-flop clock frequency) of a ΔΣ ADC (e.g. two to three orders of magnitude larger than the bandwidth of the signal of interest) may be used for effective ABAINF/CMTF/ADiC-based outlier filtering in the digital domain, following a ΔΣ modulator with a linear loop filter.

FIG. 36 shows illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and ADiC-based digital filtering (panel (b)). As may be seen in panel (a) of FIG. 36 , the quantizer output of a ΔΣ ADC with linear loop filter would be filtered with a linear decimation filter that would typically combine lowpass filtering with downsampling. To enable an ADiC-based outlier filtering (panel (b)), a wideband (e.g. with bandwidth approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s)) digital filter is first applied to the output of the quantizer. The output of this filter is then filtered by a digital ADiC (with appropriately chosen time parameter and the blanking range), followed by a linear lowpass/decimation filter.

FIG. 37 shows illustrative time-domain traces at points I through VI of FIG. 36 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise). In this example, a 1st order ΔΣ modulator is used, and the quantizer produces a 1-bit output shown in panel II. The digital wideband filter is a 2nd order IIR Bessel filter with the corner frequency approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s). The time parameter of the ADiC is approximately τ≈(4πB_(x))⁻¹, and the same lowpass/decimation filter is used as for the linear chain of FIG. 36 (a).

FIG. 38 shows illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and CMTF-based digital filtering (panel (b)). To enable a CMTF-based outlier filtering (panel (b)), a wideband digital filter is first applied to the output of the quantizer. The output of this filter is then filtered by a digital CMTF (with the time constant τ and appropriately chosen blanking range), followed by a linear lowpass filtering (with the modified impulse response w[k]+τ{dot over (w)}[k]) combined with decimation.

FIG. 39 shows illustrative time-domain traces at points I through VI of FIG. 38 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise). In this example, a 1st order ΔΣ modulator is used, and the quantizer produces a 1-bit output shown in panel II. The digital wideband filter is a 2nd order IIR Bessel filter with the corner frequency approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s). The time parameter of the CMTF is τ=(4πB_(x))⁻¹, and the impulse response of the lowpass filter in the decimation stage is modified as w[k]+(4πB_(x))⁻¹ {dot over (w)}[k].

To prevent excessive distortions of the quantizer output by high-amplitude transients (especially for high-order ΔΣ modulators), and thus to increase the dynamic range of the ADC and/or the effectiveness of outlier filtering, an analog clipper (with appropriately chosen clipping values) should precede the ΔΣ modulator, as schematically shown in FIGS. 40 and 42 .

FIG. 40 shows illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and ADiC-based digital filtering (panel (b)), with additional clipping of the analog input signal.

FIG. 41 shows illustrative time-domain traces at points I through VI of FIG. 40 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise). In this example, a 1st order ΔΣ modulator is used, and the quantizer produces a 1-bit output. The digital wideband filter is a 2nd order IIR Bessel filter with the corner frequency approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s). The time parameter of the ADiC is approximately τ≈(4πB_(x))⁻¹, and the same lowpass/decimation filter is used as for the linear chain of FIG. 40 (a).

FIG. 42 shows illustrative signal chains for a ΔΣ ADC with linear loop and decimation filters (panel (a)), and for a ΔΣ ADC with linear loop filter and CMTF-based digital filtering (panel (b)), with additional clipping of the analog input signal.

FIG. 43 shows illustrative time-domain traces at points I through VI of FIG. 42 , and the output of the ΔΣ ADC with linear loop and decimation filters for the signal affected by AWGN only (w/o impulsive noise). In this example, a 1st order ΔΣ modulator is used, and the quantizer produces a 1-bit output. The digital wideband filter is a 2nd order IIR Bessel filter with the corner frequency approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s). The time parameter of the CMTF is τ=(4πB_(x))⁻¹, and the impulse response of the lowpass filter in the decimation stage is modified as w[k]+(4πB_(x))⁻¹ w[k].

7 ADiC Variants

Let us revisit the ADiC block diagram shown in FIG. 12 , where the depreciator is a blanker. In FIG. 12 , x(t) is the input, y(t) is the output, and the “intermediate” signal χ(t) may be called the Differential Clipping Level (DCL). Without the blanker (or outliers), the DCL would be the output of a 1st order linear lowpass filter with the corner frequency 1/(2n r). The blanker input is the “difference signal” x(t)−χ(t). The blanker output would be equal to its input if the input falls within the blanking range, and would be zero otherwise.

If there is established a robust range [α⁻, α₊] around the difference signal, then whatever protrudes from this range may be identified as an outlier. As has been previously shown in this disclosure, such a robust range may be established in real time, for example, using quantile tracking filters.

While in the majority of the examples in this disclosure a robust range is established using quantile tracking filters, one skilled in the art will recognize that such a range may also be established based on a variety of other robust measures of dispersion of the difference signal, such as, for example, mean or median absolute deviation.

Here (and throughout the disclosure) “robust” should be read as “insensitive to outliers” when referred to filtering, establishing a range, estimating a measure of central tendency, etc.

“Robust” may also be read as “less-than-proportional” when referred to the change in an output of a filter, an estimator of a range and/or of a measure of central tendency, etc., in response to a change in the amplitude and/or the power of outliers.

While a linear filter (e.g. lowpass, bandpass, or bandstop) may not be a robust filter in general, it may perform as a robust filter when applied to a mixture of a signal and outliers when the signal and the outliers have sufficiently different bandwidths. For example, consider a mixture of a band-limited signal of interest and a wideband impulsive noise, and a linear filter that is transparent to the signal of interest while being opaque to the frequencies outside of the signal's band. When such a filter is applied to such a mixture, the amplitude and/or power of the signal of interest would not be affected, while the amplitude and/or power of the outliers (i.e. the impulsive noise) would be reduced. Thus this linear filter, while affecting the PSD of both the signal and the impulsive noise proportionally in the filter's passband, would disproportionately affect their PSDs outside of the filter's passband, and would disproportionately affect their amplitudes.

When the blanker's output is zero (that is, according to the above description, an outlier is encountered), the DCL x(t) in the ADiC shown in FIG. 12 would be maintained at its previous level. As the result, in the ADiC's output the outliers would be replaced by the DCL χ(t), otherwise the signal would not be affected. Thus the ADiC's output would remain bounded to within the blanking (or transparency) range around the DCL.

As discussed in § 2.4, a DCL may also be formed by the output of a robust Measure of Central Tendency (MCT) filter such as, e.g., a CMTF, and the ADiC output may be formed as a weighted average of the input signal and the DCL (see equation (20)).

As discussed above (and especially when the signal and the outliers have sufficiently different bandwidths), a DCL may also be formed by the output of a linear filter that disproportionately reduces the amplitudes of the outliers in comparison with that of the signal of interest. An “ideal” linear filter to establish such a DCL would be a filter having an effectively unity frequency response and an effectively zero group delay over the bandwidth of the signal of interest.

When applied to the input signal x(t) comprising a signal of interest, a linear filter having an effectively unity frequency response and an effectively constant group delay Δt>0 over the bandwidth of the signal of interest would establish a DCL for a delayed signal x(t-Δt).

Further, a DCL may be formed by a large variety of linear and/or nonlinear filters, such that a filter produces an output that represents a measure of location of the input signal in a moving time window (a Windowed Measure of Location, or WML), and/or by a combination of such filters.

Thus, as illustrated in FIG. 44 , an ADiC structure may also be given the following alternative description.

First, a Differential Clipping Level (DCL) x(t) is formed. In FIG. 44 , the DCL is formed by a DCL circuit that converts the input signal x(t) into the output x(t). A preferred way to establish such a DCL would be to obtain it as an output of a robust (i.e. insensitive to outliers) filter estimating a local (windowed) measure of location (a Windowed Measure of Location, or WML) of the input signal x(t). Such a filter may be, for example, a median filter, a CMTF, an NDL, an MTF, a Trimean Tracking Filter (TTF), or a combination of such filters. However, a DCL may also be obtained by a linear (e.g. lowpass, bandpass, or bandstop) filter applied to the input signal x(t), or by a combination of linear and robust nonlinear filters mentioned above.

Then, a difference signal x(t)−χ(t) is obtained as the difference between the input signal x(t) and the DCL x(t).

Next, a robust range [α⁻(t),α₊(t)] of the difference signal is determined, by a Robust Range Circuit (RRC), as a range between the upper (α₊(t)) and the lower (α⁻(t)) robust “fences” for the difference signal. For example, such fences may be constructed as linear combinations of the outputs of quantile tracking filters, including linear combinations of the outputs of quantile tracking filters with different slew rate parameters. Several examples of (analog and/or digital) RRCs are provided in this disclosure, including those shown in FIGS. 21, 26, 32, 51, and 52 .

The difference signal and the fences are used as input signals of a depreciator (or a differential depreciator, as described below) characterized by an influence function (or a differential influence function having a difference response, as described below) and producing a depreciator output that is effectively equal to the difference signal when the difference signal is within the robust range [α⁻(t), α₊(t)] (the “blanking range”, or “transparency range”), smaller than the difference signal when the difference signal is larger than α₊(t), and larger than the difference signal when the difference signal is smaller than α⁻(t).

In the examples of the depreciators discussed above, the influence function

of a depreciator is characterized by the transparency function

such that

=x

(see, e.g., equations (12), (13), and (14)), and thus those examples imply that α⁻(t)<0<α₊(t). Various examples of such transparency functions are given throughout the disclosure, including those shown in FIGS. 3, 4, 20, 57, 59, 80, and 82 .

In order to efficiently depreciate outliers when sign(α⁻(t))=sign(α₊(t)), it may be preferred to use a differential depreciator. The differential influence function

(x) of such a differential depreciator may be related to the influence function

(x) of the depreciators discussed previously as follows

$\begin{matrix} {{{\overset{\_}{\mathcal{I}_{\alpha_{-}}^{\alpha_{+}}}(x)} = {\mathcal{M} + {\mathcal{I}_{\alpha_{-} - \mathcal{M}}^{\alpha_{+} - \mathcal{M}}\left( {x - \mathcal{M}} \right)}}},} & (47) \end{matrix}$ where

is an average value of the lower and the upper fences, α⁻(t)<

<α₊(t) (e.g.

=(α⁻(t)+α₊(t))/2).

Note that it follows from equation (47) and the above discussion of influence functions that x<

≤

for x<α⁻ and

≤

<x for α₊<x.

It may be convenient to characterize a differential depreciator with the differential influence function

by its difference response x−

(i.e. by the difference between the input and the output of a depreciator), as illustrated in FIG. 45 . It may be seen in FIG. 45 that the difference response of a differential depreciator is a monotonically increasing function of its input, and the difference response x−

(x) is effectively zero when the depreciator input is within the transparency range (i.e. for α⁻<x<α₊).

A function ƒ(x) would be monotonically increasing (also increasing or non-decreasing) if for any Δx≥0 ƒ(x+Δx)≥ƒ(x).

Finally, as shown in FIG. 44 , the ADiC output y(t) is formed as a sum of the DCL χ(t) and the depreciator output.

Specifically, for the blanking influence function

_(α−) ^(α+)(x) (e.g. given by equation (18)), the ADiC output y(t) would be proportional to the ADiC input x(t) when the difference signal is within the range [α⁻, α₊], and it would be proportional to the DCL χ(t) otherwise:

$\begin{matrix} {{\mathcal{y}} = {{G\left\lbrack {\chi + {\mathcal{B}_{\alpha_{-}}^{\alpha_{+}}\left( {x - \chi} \right)}} \right\rbrack} = {G\left\{ {\begin{matrix} x & {{{for}\alpha_{-}} \leq {x - \chi} \leq \alpha_{+}} \\ \chi & {otherwise} \end{matrix},} \right.}}} & (48) \end{matrix}$ where G is a positive or a negative gain value.

FIG. 46 shows a block diagram of such an ADiC with a blanking depreciator, where the multiplication of the ADiC input x(t) and the DCL χ(t) by the depreciator weights is performed by a single pole double-throw switch (SPDT), forming the ADiC output y(t) according to equation (48) with G=1.

As shown in FIG. 46 , a Window Detector Circuit (WDC) (or Window Comparator Circuit (WCC), or Dual Edge Limit Detector Circuit (DELDC)) may be used to determine whether the difference signal is within the range [α⁻, α₊], where said range is produced by an RRC.

In FIG. 46 , the WDC outputs a two-level Switch Control Signal (SCS) so that the 1st level corresponds to the WDC input (the difference signal x(t)−χ(t)) being within the range [α⁻, α₊], α⁻<x(t)−χ(t)<α₊, and otherwise the WDC outputs the 2nd level. The 1st level WDC output puts the switch in position “1”, and the second level puts the switch in position “2”. As the result, in the ADiC output y(t) the outliers would be replaced by the DCL χ(t), otherwise the signal would not be affected.

FIG. 47 shows illustrative signal traces for the ADiC shown in FIG. 46 with the DCL established by a linear lowpass filter, and the lower (α₊(t)) robust fences for the difference signal are constructed as a linear combination of the outputs of two QTFs. In this example, the WML of the input signal x(t) is obtained as a weighted average in the moving window w(t).

If the outliers are depreciated by a differential blanker with the influence function

(x) given by

${\overset{\_}{\mathcal{B}_{\alpha_{-}}^{\alpha_{+}}}(x)} = \left\{ {\begin{matrix} x & {{{for}\alpha_{-}} \leq x \leq \alpha_{+}} \\ \frac{\alpha_{+} + \alpha_{-}}{2} & {otherwise} \end{matrix},} \right.$ (49) then the ADiC output y(t) would be given by

${{\mathcal{y}}(t)} = {G\left\{ {\begin{matrix} {x(t)} & {{{for}{\alpha_{-}(t)}} \leq {{x(t)} - {\chi(t)}} \leq {\alpha_{+}(t)}} \\ {{\chi(t)} + \frac{\alpha_{+} + {\alpha_{-}(t)}}{2}} & {otherwise} \end{matrix},} \right.}$ (50) where G is a positive or a negative gain value.

7.1 Robust Filters

While a linear filter (e.g. lowpass, bandpass, or bandstop) may not be a robust filter in general, it may perform as a robust filter when applied to a mixture of a signal and outliers when the signal and the outliers have sufficiently different bandwidths. In such a case, a linear filter, while affecting the PSD of both the signal and the impulsive noise proportionally in the filter's passband, would disproportionately affect their PSDs outside of the filter's passband, and would disproportionately affect their amplitudes.

Examples of nonlinear filters estimating a robust local measure of location of the input signal x(t) include, but are not limited to, the following nonlinear filters: a median filter; a slew rate limiting filter; a Nonlinear Differential Limiter (NDL) [9, 10, 24, 32]; a Clipped Mean Tracking Filter (CMTF); a Median Tracking Filter (MTF); a Trimean Tracking Filter (TTF) described below (see § 7.1.1).

7.1.1 Trimean Tracking Filter (TTF)

Simple yet efficient real-time robust filters may be constructed as weighted averages of outputs of quantile tracking filters described in § 3.

In particular, a Trimean Tracking Filter (TTF) may be constructed as a weighted average of the outputs of the MTF (§ 3.1) and the QTFs (§ 3.2)

$\begin{matrix} {{{Q_{12w3}(t)} = \frac{{Q_{1}(t)} + {{wQ}_{2}(t)} + {Q_{3}(t)}}{2 + w}},} & (51) \end{matrix}$ where w≥0.

Note that in practical electronic-circuit (analog) TTF implementations continuous high-resolution comparators (see § 11.3) may be used for implementing the MTF and the QTFs. Alternatively, comparators with hysteresis (Schmitt triggers) may be used to reduce the comparator switching rates when the values of the inputs of the MTF and the QTFs are close to their respective outputs.

An example of a numerical algorithm implementing a finite-difference version of a TTF may be given by the following MATLAB function:

  function y = TTF(x,dt,mu,w) y = zeros(size(x(:))); gamma = mu*dt; Q3 = x(1); Q2 = x(1); Q1 = x(1); y(1) = x(1); for i = 2:length(x);  dX = x(i) − Q3;  if dX > −0.5*gamma & dX < 1.5*gamma. Q3 = x(i);  else Q3 = Q3 + gamma*(sign(dX)+0.5);  end  dX = x(i) − Q2;  if abs(dX) < gamma. Q2 = x(i);  else. Q2 = Q2 + gamma*sign(dX);  end  dX = x(i) − Q1;  if dX > −1.5*gamma & dX < 0.5*gamma. Q1 = x(i);  else. Q1 = Q1 + gamma*(sign(dX)−0.5);  end  y(i) = (Q1+w*Q2+Q3)/(2+w); end return

An example of a numerical algorithm implementing a numerical version of an ADiC with the DCL formed by a TTF may be given by the following MATLAB function:

function [xADiC,xDCL,alpha_p,alpha_m] = ADiC_TTF(x,dt,mu_TTF,w,mu_range,beta) %--------------------------------------------------------------------------------------------------- xADiC = zeros(size(x)); xDCL = zeros(size(x)); alpha_p = zeros(size(x)); alpha_m = zeros(size(x)); gamma_TTF = mu_TTF*dt; gamma_range = mu_range*dt; xADiC(1) = x(1); xDCL(1) = x(1); Q3 = x(1); Q2 = x(1); Q1 = x(1); dQ3 = 0; dQ1 = 0; %--------------------------------------------------------------------------------------------------- for i = 2:length(x); % TRIMEAN TRAKING FILTER (TTF)  dX = x(i) − Q3;  if dX > −0.5*gamma_TTF & dX < 1.5*gamma_TTF Q3 = x(i);  else Q3 = Q3 + gamma_TTF*(sign(dX)+0.5); end  dX = x(i) − Q2;  if abs(dX) < gamma_TTF Q2 = x(i);  else Q2 = Q2 + gamma_TTF*sign(dX); end  dX = x(i) − Q1;  if dX > −1.5*gamma_TTF & dX < 0.5*gamma_TTF Q1 = x(i);  else Q1 = Q1 + gamma_TTF*(sign(dX)−0.5); end % TRIMEAN DCL  xDCL(i) = (Q1+w*Q2+Q3)/(2+w); % ″Difference Signal″  dX = x(i) − xDCL(i); % QUARTILE TRACKING FILTERS (QTFs) for difference signal  dX3 = dX − dQ3;  if dX3 > −0.5*gamma_range & dX3 < 1.5*gamma_range dQ3 = dX;  else dQ3 = dQ3 + gamma_range*(sign(dX3)+0.5); end  dX1 = dX − dQ1; if dX1 > −1.5*gamma_range & dX1 < 0.5*gamma_range dQ1 = dX;  else dQ1 = dQ1 + gamma_range* (sign(dX1)−0.5); end % TUKEY’S RANGE  alpha_p(i) = dQ3 + beta*(dQ3−dQ1);  alpha_m(i) = dQ1 − beta*(dQ3−dQ1); % ADiC output  if dX>alpha_p(i) | dX<alpha_m(i) xADiC(i) = xDCL(i);  else xADiC(i) = x(i); end end return

FIG. 48 and FIG. 49 show illustrative signal traces for the ADiC shown in FIG. 46 with the DCL established by a TTF.

The top panel in FIG. 48 shows the input ADiC signal without noise (an up-chirp signal), and the panel second from the top shows the input ADiC signal with noise (the signal x(t) at point I in FIG. 46 ). The middle panel in FIG. 48 shows the DCL signal χ(t) established by a robust filter (a TTF) applied to x(t) (the signal χ(t) at point II in FIG. 46 ), and the panel second from the bottom shows the difference signal x(t)−χ(t) (the signal at point III in FIG. 46 ). The bottom panel in FIG. 48 shows the upper (α₊(t)) and lower (α⁻(t)) fences of the difference signal produced by the Robust Range Circuit (RRC).

The top panel in FIG. 49 shows the bandpass-filtered up-chirp signal without noise, and the panel second from the top shows the bandpass-filtered signal with noise (the signal at point IV in FIG. 46 ). The middle panel in FIG. 49 shows the bandpass-filtered ADiC output y(t) (the signal at point V in FIG. 46 ), while the lower two panels show the bandpass-filtered noise with and without ADiC.

8 Simplified ADiC Structure

Note that the robust fences α₊(t) and α⁻(t) may be constructed for the input signal itself (as opposed to the difference signal) in such a way that the DCL value may be formed as an average

(t) of the upper and lower fences, e.g., as the arithmetic mean of the fences: χ(t)=

(t)=[α₊(t)+α⁻(t)]/2. Then, if the depreciator in FIG. 44 is characterized by the influence function

(x), where α₊′=α₊−

and α⁻′=α⁻−

, the ADiC output y(t) would be described by

$\begin{matrix} {{\mathcal{y}} = {{\mathcal{M} + {\mathcal{I}_{\alpha_{-} - \mathcal{M}}^{\alpha_{+} - \mathcal{M}}\left( {x - \mathcal{M}} \right)}} = {{\overset{\_}{\mathcal{I}_{\alpha_{-}}^{\alpha_{+}}}(x)}.}}} & (52) \end{matrix}$

FIG. 50 provides a block diagram of such simplified ADiC structure wherein the robust fences α₊(t) and α⁻(t) are constructed for the input signal itself (as opposed to the difference signal) and the outliers are depreciated by a differential depreciator

${\overset{\_}{\mathcal{I}_{\alpha_{-}}^{\alpha_{+}}}(x)}.$

The robust fences α₊(t) and α⁻(t) may be constructed in a variety of ways, e.g. as linear combinations of the outputs of QTFs applied to the input signal.

FIG. 51 provides an example of such simplified ADiC structure wherein the robust fences α₊(t) and α⁻(t) are constructed for the input signal as linear combinations of the outputs of QTFs applied to the input signal, and wherein the outliers are depreciated by a differential blanker that may be described by the differential blanking function

(x) given by equation (49).

FIG. 52 provides a simplified diagram of illustrative electronic circuit for the ADiC structure shown in FIG. 51 . In this example, ADiC circuit acts as an Outlier-Removing Buffer (ORB), removing the outliers without otherwise affecting the signal. As an example, FIG. 53 provides illustrative signal traces from an LTspice simulation of such simple ORB circuit. The upper panel in the figure shows the ORB's input, the middle panel shows its “fences” α₊(t) and α⁻(t), and the lower panel shows the ORB output.

An example of a numerical algorithm implementing a numerical version of an ADiC shown in FIG. 51 may be given by the following MATLAB function:

function [xADiC,alpha_p,alpha_m] = ADiC_QTFs(x,dt,mu,beta) %------------------------------------------------------------------------------------------ xADiC = zeros(size(x)); alpha_p = zeros(size(x)); alpha_m = zeros(size(x)); gamma = mu*dt; xADiC(1) = x(1); Q3 = x(1); Q1 = x(1); for i = 2:length(x); % QTFs  dX = x(i) − Q3;  if dX > −0.5*gamma & dX < 1.5*gamma Q3 = x(i);  else Q3 = Q3 + gamma*(sign(dX)+0.5); end  dX = x(i) − Q1;  if dX > −1.5*gamma & dX < 0.5*gamma Q1 = x(i);  else Q1 = Q1 + gamma*(sign(dX)−0.5); end % FENCES  alpha_p(i) = Q3 + beta*(Q3−Q1);  alpha_m(i) = Q1 − beta*(Q3−Q1); % ADiC output  if x(i)>alpha_p(i) | x(i)<alpha_m(i) xADiC(i) = 0.5*(Q3+Q1);  else xADiC(i) = x(i); end end return

FIG. 54 provides and example of applying a numerical version of an ADiC shown in FIG. 51 to the input signal used in FIG. 15 , illustrating that its performance is similar to that of the MATLAB function of § 2.5.

8.1 Cascaded ADiC Structures

To improve suppression of outliers, two or more ADiCs may be cascaded, as illustrated in FIG. 55 . Since an ADiC depreciates outliers, the fences in a subsequent ADiC may be made “tighter” as they would be less affected by the reduced (depreciated) outliers, thus enabling further outlier reduction.

This is illustrated in FIG. 56 . The top panel in the figure shows the signal of interest affected by outlier noise (the signal x(t) in FIG. 55 ). While, as shown in the panel second from the top, the “intermediate” fences α₊′(t) and α⁻(t) (e.g. constructed using QTFs) would be relatively robust, they would still be affected by the outliers, and the range [α⁻′, α₊′] for the outlier depreciation may be unnecessarily wide. Since only those outliers that extend outside of the range [α⁻, α₊′] would be depreciated, the “intermediate” ADiC output y′(t) would still contain outliers that do not protrude from the range formed by α₊′(t) and α⁻(t). This may be seen in the middle panel of FIG. 56 .

Since the outliers in y′(t) are reduced in comparison with those in x(t), the fences α₊(t) and α⁻(t) around y′(t) may be made “tighter” as they would be less affected by the reduced (depreciated) outliers, as may be seen in the panel second from the bottom in FIG. 56 . This may enable further outlier reduction, since the outliers that extend outside of the reduced range [α⁻, α₊] would be depreciated, as may be seen in the bottom panel of the figure.

9 ADiC-Based Filtering of Complex-Valued Signals

In a number of applications it may be desirable to perform ADiC-based filtering of complex-valued signals. For example, since the power of transient interference in a quadrature receiver would be shared between the in-phase and the quadrature channels, the complex-valued processing (as opposed to separate processing of the in-phase/quadrature components) may have a potential of significantly improving the efficiency of the ADiC-based interference mitigation [8-10, 32, for example].

In a complex-valued ADiC with the input z(t) and the DCL ζ(t), outliers may be identified based on a magnitude of the complex-valued difference signal, e.g. based on |z(t)−τ(t)|.

For example, a complex-valued CMTF may be constructed as illustrated in FIG. 57 .

In FIG. 57 , an influence function

_(α) ²(x) is represented as

(x)=x

(x²), where

(x²) is a transparency function with the characteristic transparency range α². We may require that

(x²) is effectively (or approximately) unity for x²≤α², and that

(x²) becomes smaller than unity (e.g. decays to zero) as x² increases for x²>α².

As one should be able to see in FIG. 57 , a nonlinear differential equation relating the input z(t) to the output ζ(t) of a complex-valued CMTF may be written as

$\begin{matrix} {{{\frac{d}{dt}\zeta} = {{\frac{1}{\tau}{\mathcal{I}_{\alpha^{2}}\left( {z - \zeta} \right)}} = {\frac{z - \zeta}{\tau}{\mathcal{T}_{\alpha^{2}}\left( {❘{z - \zeta}❘}^{2} \right)}}}},} & (53) \end{matrix}$ where τ is the CMTF's time parameter (or time constant).

One skilled in the art will recognize that, according to equation (53), when the magnitude of the difference signal |z(t)−ζ(t)² is within the transparency range, |z−ζ|²≤α², the complex-valued CMTF would behave as a 1st order linear lowpass filter with the 3 dB corner frequency 1/(2πτ), and, for a sufficiently large transparency range, the CMTF would exhibit nonlinear behavior only intermittently, when the magnitude of the difference signal extends outside the transparency range.

If the transparency range α²(t) is chosen in such a way that it excludes outliers of |z(t)−ζ(t)|², then, since the transparency function

(x²) decreases (e.g. decays to zero) for x²>α², the contribution of such outliers to the output ζ(t) would be depreciated.

It may be important to note that outliers would be depreciated differentially, that is, based on the magnitude of the difference signal |z(t)−ζ(t)|² and not the input signal z(t).

The degree of depreciation of outliers based on their magnitude would depend on how rapidly the transparency function

(x²) decreases (e.g. decays to zero) for x²>α². For example, as follows from equation (53), once the transparency function decays to zero, the output ζ(t) would maintain a constant value until the magnitude of |z(t)−ζ(t)|² returns to within non-zero values of the transparency function.

In FIG. 57 , double-line arrows correspond to complex-valued signals, while single-line arrows correspond to real-valued signals.

An example of a numerical algorithm implementing a numerical version of a complex-valued ADiC with the DCL formed by a complex-valued CMTF may be given by the following MATLAB function:

function [zADiC, zCMTF, dZsq_A, Q1, Q3, alpha] = ADiC_complex(z,dt,tau,beta,mu) %------------------------------------------------------------------------------ Ntau = (1+floor(tau/dt)); A = 1; %------------------------------------------------------------------------------ zADiC = zeros(size(z) ); zCMTF = zeros(size(z) ); dZsq_A = zeros(1, length(z) ); Q1 = zeros(1, length(z) ); Q3 = zeros(1, length(z) ); alpha = zeros(1, length(z) ); gamma = mu*dt; %------------------------------------------------------------------------------ zADiC(1) = z(1); zCMTF(1) = z(1); dZsq_A(1) = 0; Q1(1) = 0; Q3(1) = 0; alpha(1) = 0; Balpha = 0; %------------------------------------------------------------------------------ for i = 2:length(z);  dZ = z(i)−zCMTF(i−1); dZsq_A(i) = dZ*conj(dZ)/A; %------------------------------------------------------------------------------  dZ_ = dZsq_A(i) − Q3(i−1);  if dZ_ > −0.5*gamma & dZ_ < 1.5*gamma   Q3(i) = dZsq_A(i);  else   Q3(i) = Q3(i−1) + gamma*(sign(dZ_) +0.5);  end  dZ_ = dZsq_A(i) − Q1(i−1);  if dZ_ > −1.5*gamma & dZ_ < 0.5*gamma   Q1(i) = dZsq_A(i);  else   Q1(i) = Q1(i−1) + gamma*(sign(dZ_) −0.5);  end %------------------------------------------------------------------------------ % TUKEY’S upper fence  alpha(i) = Q3(i) + beta*(Q3(i)−Q1(i)); %------------------------------------------------------------------------------  if dZsq_A(i) > alpha(i)   Balpha = 0;  else   Balpha = dZ;  end   zCMTF (i) = zCMTF(i−1) + Balpha/Ntau;   zADiC(i) = Balpha + zCMTF(i−1); end return

FIG. 58 provides an illustration of using a complex-valued ADiC for mitigation of impulsive interference (e.g. OOB interference from a digital communication transmitter) affecting the signal in a quadrature receiver. The leftmost panels show the in-phase (I) and the quadrature (Q) traces of the baseband QRSK-modulated received signal affected by a mixture of Gaussian (e.g. thermal) and impulsive noise, observed at a bandwidth significantly wider (e.g. several times or an order of magnitude wider) than the bandwidth of the signal of interest. In a linear receiver, this signal would be digitized, filtered with a matched filter, and appropriately sampled to obtain the received symbols. However, the power of the impulsive noise in the signal bandwidth is significant, which results in a noisy, low SNR output and high error rates. This may be seen from the constellation diagram shown in the top of the rightmost panels.

Since the power of the interference would be shared between the in-phase and the quadrature channels, we may treat the I and Q traces as a complex-valued signal z(t)=I(t)+iQ(t), and apply a complex-valued ADiC for mitigation of this interference before downsampling and applying a matched filter. As one may see from the constellation diagram shown in the bottom of the rightmost panels in FIG. 58 , the ADiC filter suppresses the impulsive part of the interference affecting the baseband signal, increasing the SNR and decreasing the BER.

In FIG. 58 , double-line arrows correspond to complex-valued signals.

As illustrated in FIG. 59 , a complex-valued ADiC structure may also be given the following alternative description. In the figure, double-line arrows correspond to complex-valued signals, while single-line arrows correspond to real-valued signals.

First, a complex-valued Differential Clipping Level (DCL) ζ(t) is formed by an analog or digital DCL circuit. Such a DCL may be established as an output of a robust (i.e. insensitive to outliers) filter estimating a local Measure of Central Tendency (MCT) of the complex-valued input signal z(t). A complex-valued MCT filter may be formed, for example, by two real-valued MCT filters applied separately to the real and the imaginary components of z(t). Another example of a complex-valued MCT filter would be a complex-valued Median Tracking Filter (MTF) described in the next paragraph.

Complex-valued Median Tracking Filter—Let us consider the signal ζ(t) related to a complex-valued signal z(t) by the following differential equation:

$\begin{matrix} {{{\frac{d}{dt}\zeta} = {{\frac{A}{T}{{sgn}\left( {z - \zeta} \right)}} = {\mu{{sgn}\left( {z - \zeta} \right)}}}},} & (54) \end{matrix}$ where A is a parameter with the same units as |z| and |ζ|, T is a constant with the units of time, and the signum (sign) function is defined as sgn(z)=z/|z|. The parameter μ may be called the slew rate parameter. Equation (54) would describe the relation between the input z(t) and the output ζ(t) of a particular robust filter for complex-valued signals, the Median Tracking Filter (MTF).

Then, the difference signal z(t)−ζ(t) is obtained.

Next, a robust range a(t) for the magnitude of the difference signal is determined, by a Robust Range Circuit (RRC). Such a range may be, e.g., a robust upper fence α(t) constructed for |z(t)−ζ(t)| as a linear combination of the outputs of quantile tracking filters applied to |z(t)−ζ(t)|. Or, as shown in FIG. 59 , such a range may be, e.g., a robust upper fence α²(t) constructed for |z(t)−ζ(t)|² as a linear combination of the outputs of quantile tracking filters applied to |z(t)−ζ(t)|².

The magnitude of the difference signal and the upper fence are the input signals of the depreciator characterized by a transparency function and producing the output, e.g.,

(|z−ζ|) or

(|z−ζ|²), used for depreciation of outliers. Specifically, the ADiC output ν(t) may be set to be equal to a weighted average of the input signal z(t) and the DCL ζ(t), with the weights given by the depreciator output

(|z−ζ|) or

(|z−ζ|²) as follows: ν=ζ+(z−ζ)

(|z−ζ|),  (55) or, as shown in FIG. 59, ν=ζ+(z−ζ)

(|z−ζ| ²).  (56)

For example, for the transparency function given by a boxcar function, the ADiC output ν(t) would be equal to the ADiC input z(t) when the difference signal is within the range (e.g. α(t) or α²(t)), and it would be equal to the DCL ζ(t) otherwise:

$\begin{matrix} {{\mathcal{v}} = \left\{ {\begin{matrix} z & {{{for}{❘{z - \zeta}❘}} \leq \alpha} \\ \zeta & {otherwise} \end{matrix}.} \right.} & (57) \end{matrix}$

An example of a numerical algorithm implementing a numerical version of a complex-valued ADiC with the DCL formed by a complex-valued MTF, a boxcar depreciator, and a robust upper fence α²(t) constructed for |z(t)−ζ(t)|² using QTFs, may be given by the following MATLAB function:

function [zADiC,zMTF,dZsq_A,alpha] = ADiC_MTF_complex(z,dt,mu_MTF,mu_range,beta) %------------------------------------------------------------------------------ zADiC = zeros(size(z)); ZMTF = zeros(size(z)); dZsq_A = zeros(1,length(z)); alpha = zeros(1,length(z)); gamma_MTF = mu_MTF*dt; gamma_range = mu_range*dt; %------------------------------------------------------------------------------ zADiC(1) = z(1); zMTF(1) = z(1); dZsq_A(1) = 0; alpha(1) = 0; Q3 = 0; Q1 = 0; %------------------------------------------------------------------------------ for i = 2:length(z); dZ = z(i)−zMTF(i−1); dZsq_A(i) = dZ*conj(dZ); %------------------------------------------------------------------------------ % MEDIAN TRAKING FILTER (MTF) applied to incoming signal  if abs(dZ) < gamma_MTF   zMTF(i) = z(i);  else   zMTF(i) = zMTF(i−1) + gamma_MTF*(sign(dZ));  end %------------------------------------------------------------------------------ % QUARTILE TRACKING FILTERS (QTFs) applied to squared difference signal  dZ_ = dZsq_A(i) − Q3;  if dZ_ > −0.5*gamma_range & dZ_ < 1.5*gamma_range   Q3 = dZsq_A(i);  else   Q3 = Q3 + gamma_range*(sign(dZ_)+0.5);  end  dZ_ = dZsq_A(i) − Q1;  if dZ_ > −1.5*gamma_range & dZ_ < 0.5*gamma_range   Q1 = dZsq_A(i);  else   Q1 = Q1 + gamma_range* (sign(dZ_)−0.5);  end %------------------------------------------------------------------------------ % TUKEY'S upper fence  alpha(i) = Q3 + beta*(Q3−Q1); %------------------------------------------------------------------------------ % ADiC output  if dZsq_A(i)>alpha(i) zADiC(i) = zMTF(i); else zADiC(i) = z(i); end end return

10 Hidden Outlier Noise and its Mitigation

In addition to ever-present thermal noise, various communication and sensor systems may be affected by interfering signals that originate from a multitude of other natural and technogenic (man-made) phenomena. Such interfering signals often have intrinsic temporal and/or amplitude structures different from the Gaussian structure of the thermal noise. Specifically, interference may be produced by some “countable” or “discrete”, relatively short duration events that are separated by relatively longer periods of inactivity. Provided that the observation bandwidth is sufficiently large relative to the rate of these non-thermal noise generating events, and depending on the noise coupling mechanisms and the system's filtering properties and propagation conditions, such noise may contain distinct outliers when observed in the time domain. The presence of different types of such outlier noise is widely acknowledged in multiple applications, under various general and application-specific names, most commonly as impulsive, transient, burst, or crackling noise.

While the detrimental effects of EMI are broadly acknowledged in the industry, its outlier nature often remains indistinct, and its omnipresence and impact, and thus the potential for its mitigation, remain greatly underappreciated. There may be two fundamental reasons why the outlier nature of many technogenic interference sources is often dismissed as irrelevant. The first one is a simple lack of motivation. As discussed in this disclosure, without using nonlinear filtering techniques the resulting signal quality would be largely invariant to a particular time-amplitude makeup of the interfering signal and would depend mainly on the total power and the spectral composition of the interference in the passband of interest. Thus, unless the interference results in obvious, clearly identifiable outliers in the signal's band, the “hidden” outlier noise would not attract attention. The second reason is highly elusive nature of outlier noise, and inadequacy of tools used for its consistent observation and/or quantification. For example, neither power spectral densities (PSDs) nor their short-time versions (e.g. spectrograms) allow us to reliably identify outliers, as signals with very distinct temporal and/or amplitude structures may have identical spectra. Amplitude distributions (e.g. histograms) are also highly ambiguous as an outlier-detection tool. While a super-Gaussian (heavy-tailed) amplitude distribution of a signal does normally indicate presence of outliers, it does not necessarily reveal presence or absence of outlier noise in a wideband signal. Indeed, a wide range of powers across a wideband spectrum would allow a signal containing outlier noise to have any type of amplitude distribution. More important, the amplitude distribution of a non-Gaussian signal is generally modifiable by linear filtering, and such filtering may often convert the signal from sub-Gaussian into super-Gaussian, and vice versa. Thus apparent outliers in a signal may disappear and reappear due to various filtering effects, as the signal propagates through media and/or the signal processing chain.

10.1 “Outliers” Vs. “Outlier Noise”

Even when sufficient excess bandwidth is available for outlier noise observation, outlier noise mitigation faces significant challenges when the typical amplitude of the noise outliers is not significantly larger than that of the signal of interest. That would be the case, e.g., if the signal of interest itself contains strong outliers, or for large signal-to-noise ratios (SNRs), especially when combined with high rates of the noise-generating events. In those scenarios removing outliers from the signal+noise mixture may degrade the signal quality instead of improving it. This is illustrated in FIG. 60 . The left-hand side of the figure shows a fragment of a low-frequency signal affected by a wideband noise containing outliers. However, the amplitudes of the signal and the noise outliers are such that only one of the outlier noise pulses is an outlier for the signal+noise mixture. The right-hand side of the figure illustrates that removing only this outlier increases the baseband noise, instead of decreasing it by the “outlier noise” removal.

10.2 “Excess Band” Observation for In-Band Mitigation

As discussed earlier, a linear filter affects the amplitudes of the signal of interest, wide-band Gaussian noise, and wideband outlier noise differently. FIG. 61 illustrates how one may capitalize on these differences to reliably distinguish between “outliers” and “outlier noise”. The left-hand side of the figure shows the same fragment of the low-frequency signal affected by the wideband noise containing outliers as in the example of FIG. 60 . This signal+noise mixture may be viewed as an output of a wideband front-end filter. When applied to the output of the front-end filter, a baseband lowpass filter that does not attenuate the low-frequency signal would still significantly reduce the amplitude of the wideband noise. Then the difference between the input signal+noise mixture and the output of the baseband filter with zero group delay across signal's band would mainly contain the wideband noise filtered with highpass filter obtained by spectral inversion of the baseband filter. This is illustrated in the right-hand side of FIG. 61 , showing that now the outliers in the difference signal are also the noise outliers.

Thus detection of outlier noise may be accomplished by an “excess band filter” constructed as a cascaded lowpass/highpass (for a baseband signal of interest), or as a cascaded bandpass/bandstop filter (for a passband signal of interest). This is illustrated in FIG. 62 where, for simplicity, finite impulse response (FIR) filters are used. Provided that the “excess band” is sufficiently wide in comparison with the band of the signal of interest, the impulse response of an excess band filter contains a distinct outlier component. When convolved with a band-limited signal affected by a wideband outlier noise, such a filter would suppress the signal of interest while mainly preserving the outlier structure of the noise. Below we illustrate how such excess band observation of outlier noise may enable its efficient in-band mitigation.

10.3 Complementary ADiC Filter (CAF)

Following the previous discussion in this disclosure, the basic concept of wide-band outlier noise removal while preserving the signal of interest and the wideband non-outlier noise may be stated as follows: (i) first, establish a robust range around the signal of interest such that this robust range excludes wideband noise outliers; (ii) then replace noise outliers with mid-range. When we are not constrained by the needs for either analog or wideband, high-rate real-time digital processing, in the digital domain these requirements may be satisfied by a Hampel filter or by one of its variants [45]. In a Hampel filter the “mid-range” is calculated as a windowed median of the input, and the range is determined as a scaled absolute deviation about this windowed median. However, Hampel filtering may not be performed in the analog domain, and/or it may become prohibitively expensive in high-rate real-time digital processing.

As discussed earlier, a robust range [α⁻, α₊] that excludes outliers of a signal may also be obtained as a range between Tukey's fences [48] constructed as linear combinations of the 1st and the 3rd quartiles of the signal in a moving time window, or constructed as linear combinations of other quantiles. In practical analog and/or real-time digital implementations, approximations for the time-varying quantile values may be obtained by means of Quantile Tracking Filters (QTFs) described in Section 3. Linear combinations of QTF outputs may also be used to establish the mid-range that replaces the outlier values. For example, the signal values that protrude from the range [α⁻, α₊] may be replaced by (Q_([1])+wQ_([2])+Q_([3]))/(w+2), where w≥0. Then such mid-range level may be called a Differential Clipping Level (DCL), and a filter that established the range [α⁻, α₊] and replaces outliers with the DCL may be called an Analog Differential Clipper (ADiC).

As discussed in Section 10.1, for reliable discrimination between “outliers” and “outlier noise” the amplitude of the signal of interest should be much smaller than a typical amplitude of the noise outliers. Therefore, the best application for an ADiC would be the removal of outliers from the “excess band” noise (see Section 10.2), when the signal of interest is mainly excluded. Then ADiC-based filtering that mitigates wideband outlier noise while preserving the signal of interest may be accomplished as described below.

10.3.1 Spectral Inversion by ADiC and “Efecto Cucaracha”

Let us note that applying an ADiC to an impulse response of a highpass and/or bandstop filter containing a distinct outlier would cause the “spectral inversion” of the filter, transforming it into its complement, e.g. a highpass filter into a lowpass, and a bandstop filter into a bandpass filter. This is illustrated in FIG. 63 where, for simplicity, FIR filters are used. Thus, as further demonstrated in FIG. 64 , an ADiC applied to a filtered outlier noise may significantly reshape its spectrum. Such spectral reshaping by an ADiC may be called a “cockroach effect”, when reducing the effects of outlier noise in some spectral bands increases its PSD in the bands with previously low outlier noise PSD. We may use this property of an ADiC for removing outlier noise while preserving the signal of interest, and for addressing complex interference scenarios.

10.3.2 Removing Outlier Noise while Preserving Signal of Interest

For example, in FIG. 65 the bandpass filter mainly matches the signal's passband, and the bandstop filter is its “complement” obtained by spectral inversion of the bandpass filter, so that the sum of the outputs of the bandpass and the bandstop filters is equal to the input signal. The input passband signal of interest affected by a wideband outlier noise may be seen in the upper left of FIG. 65 . The output of the bandpass filter is shown in the upper middle of the figure, where the trace marked by “Δ” shows the effect of the outlier noise on the passband signal. As discussed in Section 10.2, the output of the bandstop filter is mainly the “excess band” noise. After the outliers of the excess band noise are mitigated by an ADiC (or another nonlinear filter mitigating noise outliers), the remaining excess band noise is added to the output of the bandpass filter. As the result, the combined output (seen in the upper right of the figure) would be equal to the original signal of interest affected by a wideband noise with reduced outliers. This mitigated outlier noise is shown by the trace marked by “Δ” in the upper right.

FIG. 66 summarizes such “complementary” ADiC-based outlier noise removal from band-limited signals. To simplify the mathematical expressions, in FIG. 66 we use zero for the group delay of the linear filters and assume that the ADiC completely removes the outlier component i(t) from the excess band. We may call this ADiC-based filtering structure a Complementary ADiC Filter (CAF).

As illustrated in FIG. 67 , a complementary ADiC filter may be given the following description. In a CAF, a “signal filter” (e.g. a lowpass, a bandpass, or another filter that mainly matches the desired signal's band) is applied to the input signal containing the signal of interest and wideband noise and interference. The output of the signal filter provides a “filtered input signal”. A “complement signal filter” is also applied to the input signal to provide a “complement filtered input signal”. The complement filtered input signal is further filtered with a nonlinear filter that mitigates outliers in the complement filtered input signal, providing a “nonlinear filtered complement signal”. Such a nonlinear filter may be, for example, an ADiC filter described in this disclosure, or a variant of an ADiC filter. Finally, the CAF output signal is formed as the sum of the filtered input signal and the nonlinear filtered complement signal.

Note that the sum of the filtered input signal and the complement filtered input signal would be effectively equal the input signal (e.g. to the time-delayed version of the input signal, based on the group delay of the signal filter). Thus the complement filtered input signal may also be obtained as the difference between a time-delayed input signal and the filtered input signal.

11 Explanatory Comments and Discussion

This section of the disclosure provides several comments on the disclosure given in Sections 1 through 10.

It should be understood that the specific examples in this disclosure, while indicating preferred embodiments of the invention, are presented for illustration only. Various changes and modifications within the spirit and scope of the invention should become apparent to those skilled in the art from this detailed description. Furthermore, all the mathematical expressions, diagrams, and the examples of hardware implementations are used only as a descriptive language to convey the inventive ideas clearly, and are not limitative of the claimed invention.

Further, one skilled in the art will recognize that the various equalities and/or mathematical functions used in this disclosure are approximations that are based on some simplifying assumptions and are used to represent quantities with only finite precision. We may use the word “effectively” (as opposed to “precisely”) to emphasize that only a finite order of approximation (in amplitude as well as time and/or frequency domains) may be expected in hardware implementation.

Ideal vs. “real” blankers—For example, we may say that an output of a blanker characterized by a blanking value is effectively zero when the absolute value (modulus) of said output is much smaller (e.g. by an order of magnitude or more) than the blanking range.

In addition to finite precision, a “real” blanker may be characterized by various other non-idealities. For example, it may exhibit hysteresis, when the blanker's state depends on its history.

For a “real” blanker, when the value of its input x extends outside of its blanking range [α⁻, α₊], the value of its transparency function would decrease to effectively zero value over some finite range of the increase (decrease) in x. If said range of the increase (decrease) in x is much smaller (e.g. by an order of magnitude or more) than the blanking range, we may consider such a “real” blanker as being effectively described by equations (18), (32) and/or (37).

Further, in a “real” blanker the change in the blanker's output may be “lagging”, due to various delays in a physical circuit, the change in the input signal. However, when the magnitude of such lagging is sufficiently small (e.g. smaller than the inverse bandwidth of the input signal), and provided that the absolute value of the blanker output decreases to effectively zero value, or restores back to the input value, over a range of change in x much smaller than the blanking range (e.g. by an order of magnitude or more), we may consider such a “real” blanker as being effectively described by equations (18), (32) and/or (37).

11.1 Mitigation of Non-Gaussian (e.g. Outlier) Noise in the Process of Analog-to-Digital Conversion: Analog and Digital Approaches

Conceptually, ABAINFs are analog filters that combine bandwidth reduction with mitigation of interference. One may think of non-Gaussian interference as having some temporal and/or amplitude structure that distinguishes it form a purely random Gaussian (e.g. thermal) noise. Such structure may be viewed as some “coupling” among different frequencies of a non-Gaussian signal, and may typically require a relatively wide bandwidth to be observed. A linear filter that suppresses the frequency components outside of its passband, while reducing the non-Gaussian signal's bandwidth, may destroy this coupling, altering the structure of the signal. That may complicate further identification of the non-Gaussian interference and its separation from a Gaussian noise and the signal of interest by nonlinear filters such as ABAINFs.

In order to mitigate non-Gaussian interference efficiently, the input signal to an ABAINF would need to include the noise and interference in a relatively wide band, much wider (e.g. ten times wider) than the bandwidth of the signal of interest. Thus the best conceptual placement for an ABAINF may be in the analog part of the signal chain, for example, ahead of an ADC, or incorporated into the analog loop filter of a ΔΣ ADC. However, digital ABAINF implementations may offer many advantages typically associated with digital processing, including, but not limited to, simplified development and testing, configurability, and reproducibility.

In addition, as illustrated in § 3.3, a means of tracking the range of the difference signal that effectively excludes outliers of the difference signal may be easily incorporated into digital ABAINF implementations, without a need for separate circuits implementing such a means.

While real-time finite-difference implementations of the ABAINFs described above would be relatively simple and computationally inexpensive, their efficient use would still require a digital signal with a sampling rate much higher (for example, ten times or more higher) than the Nyquist rate of the signal of interest.

Since the magnitude of a noise affecting the signal of interest would typically increase with the increase in the bandwidth, while the amplitude of the signal+noise mixture would need to remain within the ADC range, a high-rate sampling may have a perceived disadvantage of lowering the effective ADC resolution with respect to the signal of interest, especially for strong noise and/or weak signal of interest, and especially for impulsive noise. However, since the sampling rate would be much higher (for example, ten times or more higher) than the Nyquist rate of the signal of interest, the ABAINF output may be further filtered and downsampled using an appropriate decimation filter (for example, a polyphase filter) to provide the desired higher-resolution signal at lower sampling rate. Such a decimation filter may counteract the apparent resolution loss, and may further increase the resolution (for example, if the ADC is based on ΔΣ modulators).

Further, a simple (non-differential) “hard” or “soft” clipper may be employed ahead of an ADC to limit the magnitude of excessively strong outliers in the input signal.

As discussed earlier, mitigation of non-Gaussian (e.g. outlier) noise in the process of analog-to-digital conversion may be achieved by deploying analog ABAINFs (e.g. CMTFs, ADiCs, or CAFs) ahead of the anti-aliasing filter of an ADC, or by incorporating them into the analog loop filter of a ΔΣ ADC, as illustrated in FIG. 68 , panels (a) and (b), respectively.

Alternatively, as illustrated in panel (b) of FIG. 68 , a wider-bandwidth anti-aliasing filter may be employed ahead of an ADC, and an ADC with a respectively higher sampling rate may be employed in the digital part. A digital ABAINF (e.g. CMTF, ADiC, or CAF) may then be used to reduce non-Gaussian (e.g. impulsive) interference affecting a narrower-band signal of interest. Then the output of the ABAINF may be further filtered with a digital filter, (optionally) downsampled, and passed to the subsequent digital signal processing.

Prohibitively low (e.g. 1-bit) amplitude resolution of the output of a ΔΣ modulator would not allow direct application of a digital ABAINF. However, since the oversampling rate of a ΔΣ modulator would be significantly higher (e.g. by two to three orders of magnitude) than the Nyquist rate of the signal of interest, a wideband (e.g. with bandwidth approximately equal to the geometric mean of the nominal signal bandwidth B_(x) and the sampling frequency F_(s)) digital filter may be first applied to the output of the quantizer to enable ABAINF-based outlier filtering, as illustrated in panel (b) of FIG. 69 .

It may be important to note that the output of such a wideband digital filter would still contain a significant amount of high-frequency digitization (quantization) noise. As follows from the discussion in § 3, the presence of such noise may significantly simplify using quantile tracking filters as a means of determining the range of the difference signal that effectively excludes outliers of the difference signal.

The output of the wideband filter may then be filtered by a digital ABAINF (with appropriately chosen time parameter and the blanking range), followed by a linear lowpass/decimation filter.

11.2 Comments on ΔΣ Modulators

The 1st order ΔΣ modulator shown in panel I of FIG. 1 may be described as follows. The input D to the flip-flop, or latch, is proportional to an integrated difference between the input signal x(t) of the modulator and the output Q. The clock input to the flip-flop provides a control signal. If the input D to the flip-flop is greater than zero, D>0, at a definite portion of the clock cycle (such as the rising edge of the clock), then the output Q takes a positive value V_(c), Q=V_(c). If D<0 at a rising edge of the clock, then the output Q takes a negative value −V_(c), Q=−V_(c). At other times, the output Q does not change. It may be assumed that Q is the compliment of Q and Q=−Q.

Without loss of generality, we may require that if D=0 at a clock's rising edge, the output Q retains its previous value.

One may see in panel I of FIG. 1 that the output Q is a quantized representation of the input signal, and the flip-flop may be viewed as a quantizer. One may also see that the integrated difference between the input signal of the modulator and the output Q (the input D to the flip-flop) may be viewed as a particular type of a weighted difference between the input and the output signals. One may further see that the output Q is indicative of this weighted difference, since the sign of the output values (positive or negative) is determined by the sign of the weighted difference (the input D to the flip-flop).

One skilled in the art will recognize that the digital quantizer in a ΔΣ modulator may be replaced by its analog “equivalent” (i.e. Schmitt trigger, or comparator with hysteresis).

Also, the quantizer may be realized with an N-level comparator, thus the modulator would have a log₂(N)-bit output. A simple comparator with 2 levels would be a 1-bit quantizer; a 3-level quantizer may be called a “1.5-bit” quantizer; a 4-level quantizer would be a 2-bit quantizer; a 5-level quantizer would be a “2.5-bit” quantizer.

11.3 Comparators, Discriminators, Clippers, and Limiters

A comparator, or a discriminator, may be typically understood as a circuit or a device that only produces an output when the input exceeds a fixed value.

For example, consider a simple measurement process whereby a signal x(t) is compared to a threshold value D. The ideal measuring device would return ‘0’ or ‘1’ depending on whether x(t) is larger or smaller than D. The output of such a device may be represented by the Heaviside unit step function θ(D−x(t)) [30], which is discontinuous at zero. Such a device may be called an ideal comparator, or an ideal discriminator.

More generally, a discriminator/comparator may be represented by a continuous discriminator function

(x) with a characteristic width (resolution) a such that lim_(α→0)

(x)=θ(x).

In practice, many different circuits may serve as discriminators, since any continuous monotonic function with constant unequal horizontal asymptotes would produce the desired response under appropriate scaling and reflection. For example, the voltage-current characteristic of a subthreshold transconductance amplifier [51, 52] may be described by the hyperbolic tangent function,

(x)=A tan h(x/α). Note that

${\lim_{\alpha\rightarrow 0}\frac{{{\overset{\sim}{\mathcal{F}}}_{\alpha}(x)} - A}{2A}} =$ θ(x), and thus such an amplifier may serve as a discriminator.

When α<<A, a continuous comparator may be called a high-resolution comparator.

A particularly simple continuous discriminator function with a “ramp” transition may be defined as

$\begin{matrix} {{\mathcal{F}_{{\mathcal{g}},A}(x)} = \left\{ {\begin{matrix} {{\mathcal{g}}x} & {{{for}{\mathcal{g}}{❘x❘}} \leq A} \\ {A{{sgn}(x)}} & {otherwise} \end{matrix},} \right.} & (58) \end{matrix}$ where g may be called the gain of the comparator, and A is the comparator limit.

Note that a high-gain comparator would be a high-resolution comparator.

The “ramp” comparator described by equation (58) may also be called a clipping amplifier (or simply a “clipper”) with the clipping value A and gain g.

For asymmetrical clipping values α₊ (upper) and α⁻ (lower), a clipper may be described by the following clipping function C_(α) ⁻ ^(α) ⁺ (x):

$\begin{matrix} {{C_{\alpha_{-}}^{\alpha_{+}}(x)} = \left\{ {\begin{matrix} \alpha_{+} & {{{for}x} > \alpha_{+}} \\ \alpha_{-} & {{{for}x} < \alpha_{-}} \\ x & {otherwise} \end{matrix}.} \right.} & (59) \end{matrix}$

It may be assumed in this disclosure that the outputs of the active components (such as, e.g., the active filters, integrators, and the gain/amplifier stages) may be limited to (or clipped at) certain finite ranges, for example, those determined by the power supplies, and that the recovery times from such saturation may be effectively negligible.

11.4 Windowed Measures of Location

In the current disclosure, a Windowed Measure of Location (WML) would be a summary statistics that attempts to describe a set of data in a given time window by a single value. Most typically, a measure of location may be understood as a measure of central location, or central tendency. A weighted mean (often called a weighted average) would be the most typically used measure of central tendency, and it may be called a Windowed Measure of Central Tendency (WMCT). When the weights do not depend on the data values, a WMCT may be considered a linear measure of central tendency.

An example of a (generally) nonlinear measure of central tendency would be the quasi-arithmetic mean or generalized ƒ-mean [53]. Other nonlinear measures of central tendency may include such measures as a median or a truncated mean value, or an L-estimator [48, 54, 55].

A measure of location obtained in a moving time window w(t) would be a Windowed Measure of Location (WML). For example, given an input signal x(t), the output χ(t) of a linear lowpass or bandpass filter with the impulse response w(t), χ(t)=(w*x)(t), may represent a linear measure of location of the input signal x(t) in a moving time window w(t).

Note that when ∫_(−∞) ^(∞)ds w(s)=1, w(t) would represent a lowpass filter, and a linear WML in such a time window would be a linear WMCT. However, such w(t) that ∫_(−∞) ^(∞)ds w(s)=0 (e.g., an impulse response of a linear bandpass or bandstop filter) may also be used to obtain a linear WML for a signal. For example, if the linear filter has an effectively unity frequency response and an effectively zero group delay over the bandwidth of a signal of interest, such a filter may be used to obtain a linear WML for the signal of interest affected by an interfering signal.

As another example, let us consider the signal χ(t) implicitly given by the following equation:

$\begin{matrix} {{{\int_{- \infty}^{\infty}{{{dsw}\left( {t - s} \right)}{{sign}\left( {{\chi(t)} - {x(s)}} \right)}}} = {{{w(t)}*{{sign}\left( {\chi - {x(t)}} \right)}} = 0}},} & (60) \end{matrix}$ where ∫_(−∞) ^(∞)ds w(s)=1. Such χ(t) would represent a weighted median of the input signal x(t) in a moving time window w(t), and χ(t) would be a robust nonlinear WML (WMCT) of the input signal x(t) in a moving time window w(t).

One skilled in the art will recognize that such nonlinear filters as a median filter, a CMTF, an NDL, an MTF, or a TTF would represent nonlinear WMLs (i.e. WMCTs) of their inputs.

11.5 Mitigation of Non-Impulsive Non-Gaussian Noise

The temporal and/or amplitude structures (and thus the distributions) of non-Gaussian signals are generally modifiable by linear filtering, and non-Gaussian interference may often be converted from sub-Gaussian into super-Gaussian, and vice versa, by linear filtering [9, 10, 32, e.g.]. Thus the ability of the ADiCs/CMTFs/ABAINFs/CAFs disclosed herein, and ΔΣ ADCs with analog nonlinear loop filters, to mitigate impulsive (super-Gaussian) noise may translate into mitigation of non-Gaussian noise and interference in general, including sub-Gaussian noise (e.g. wind noise at microphones). For example, a linear analog filter may be employed as an input front end filter of the ADC to increase the peakedness of the interference, and the ΔΣ ADCs with analog nonlinear loop filter may perform analog-to-digital conversion combined with mitigation of this interference. Subsequently, if needed, a digital filter may be employed to compensate for the impact of the front end filter on the signal of interest.

Alternatively, increasing peakedness of the interference may be achieved by modifying the wideband filter following the ΔΣ modulator and preceding the ADiC/CAF, as illustrated in panel (b) of FIG. 70 . In this example, the function of the wideband filter with the impulse response g[k] would be to enhance the distinction between the signal of interest and the outlier noise, thus increasing the efficiency of the outlier noise mitigation by the ADiC/CAF.

The response g[k] of the wideband “outlier-enhancing” filter may be such that it affects the signal of interest, e.g. g[k]*w[k]≠w[k], where w[k] is the response of the “original” narrow-band “baseband” filter (such as a lowpass or bandpass filter) of the ΔΣ ADC before the addition of the ADiC-based processing (see panel (a) of FIG. 70 ). In such a case, the filter w[k] may be modified by adding the term Δw[k] to compensate for the impact of the wideband filter on the signal of interest. For example, the term Δw[k] may be chosen to satisfy the following condition: g[k]*(w[k]+Δw[k])≈w[k].  (61)

As an example, let as consider mitigation of wideband impulsive noise that was previously filtered with a 2nd order bandpass filter such that the filtered noise may no longer clearly appear impulsive, as may be seen in the upper left panel of FIG. 71 . The cross-hatched areas in the rightmost panels of FIG. 71 correspond to the passband PSD of the “ideal” signal of interest (without interference), and the solid lines correspond to the PSDs of the filtered signal+noise mixtures.

Since the noise contains non-zero power spectral density in the signal's passband, a linear passband filter applied directly to the signal+interference mixture (the panels in row II of FIG. 71 ) affects the signal and the interference proportionally in its passband, and it does not improve the passband SNR.

While the bandpass-filtered impulsive noise shown in row I of FIG. 71 may no longer be a distinct outlier noise that would be efficiently mitigated by an ADiC/CAF, filtering this noise by a 1st order highpass filter with an appropriate time constant may convert this noise into a distinctly outlier (e.g. impulsive) noise, as illustrated in the left panel of row III. As shown in row IV of FIG. 71 , such an outlier noise may be efficiently mitigated by an ADiC/CAF.

From the differential equation for a 1st order highpass filter it would follow that g_(τ)*[w+(1/τ)∫dt w]=w, where the asterisk denotes convolution and where g_(τ)(t) is the impulse response of the 1st order linear highpass filter with the corner frequency 1/(2πτ). Thus, to compensate for the insertion of a 1st order highpass filter before an ADiC/CAF, the digital bandpass filter after the ADiC/CAF may be modified by adding a term proportional to an antiderivative of the impulse response w[k] of the bandpass filter, w[k]→w[k]+Δw[k]=w[k]+(1/τ)∫dt w[k]. FIG. 72 illustrates the impulse and the frequency responses of w[k] and w[k]+Δw[k] used in the example of FIG. 71 .

The modified passband filter w[k]+Δw[k] applied to the ADiC/CAF's output would suppress the remaining interference outside of the passband, while compensating for the insertion of the 1st order highpass filter before the ADiC/CAF. This would result in an increased passband SNR, as illustrated in the panels of row V in FIG. 71 .

As another illustrative example, let as consider ADiC-based mitigation of wide-band impulsive noise affecting the baseband signal of interest in the presence of a strong adjacent-channel interference.

Let us first notice that an impulse response of a bandstop filter may be constructed by adding an outlier to an impulse response of a bandpass filter. Therefore, by removing (e.g. by an ADiC) this outlier from the impulse response of the bandstop filter the bandstop filter would be effectively converted to a respective bandpass filter. It then would follow that applying an ADiC filter to an impulsive noise filtered with a bandstop filter may effectively convert the bandstop-filtered impulsive noise into a respective bandpass-filtered impulsive noise, as illustrated by the idealized example of FIG. 73 .

As schematically shown in FIG. 74 , ADiC-based mitigation of wideband impulsive noise affecting the baseband signal of interest in the presence of a strong adjacent-channel interference may be performed as follows.

First, a bandstop filter is applied to the signal+noise+interference mixture to effectively suppress (or adequately reduce) the adjacent channel interference. Then the ADiC filtering is applied to the output of the bandstop filter, mitigating the impulsive noise in the baseband. Finally, a linear baseband filter is applied to the ADiC's output, suppressing the remaining interference outside of the baseband.

Let us compare the two signal processing chains shown in FIG. 75 , and inspect the examples of the time-domain traces and the PSDs of the signals at points I, II, III, IV, and V.

The example input signal (point I in FIG. 75 and the panels in row I of FIG. 76 ) consists of the baseband signal of interest, a mixture of a broadband-filtered AWGN and a broadband impulsive noise, and an adjacent-channel interference with the PSD in its passband much larger than that of the impulsive noise and that of the baseband PSD of the signal of interest.

Since the impulsive noise contains non-zero power spectral density in the signal's passband, a linear baseband filter applied directly to the signal+interference mixture (point II in FIG. 75 and the panels in row II of FIG. 76 ) affects the signal and the interference proportionally in its passband, and it does not improve the baseband SNR.

As discussed earlier, when a (narrow-band) baseband signal of interest is affected only by a mixture of a broadband Gaussian and a broadband impulsive noise, the latter may be efficiently mitigated by an ADiC. However, as illustrated in the upper left panel of FIG. 76 , the presence of a strong adjacent-channel interference may “obscure” the impulsive noise, impeding its identification as “outliers” and making a direct use of an ADiC for its mitigation ineffective.

To enable impulsive noise mitigation, one may first suppress the adjacent-channel interference by a linear bandstop filter, thus “revealing” the impulsive noise (point III in FIG. 75 and the panels in row III of FIG. 76 ) and making its “pulses” identifiable as outliers.

An ADiC applied to the bandstop-filtered signal would thus be enabled to mitigate the impulsive noise, disproportionately reducing its baseband PSD while raising its PSD in the stopband of the bandstop filter by approximately the respective amount (point IV in FIG. 75 and the panels in row IV of FIG. 76 ).

A linear baseband filter applied to the ADiC's output would suppress the remaining interference outside of the baseband, resulting in an increased baseband SNR (point V in FIG. 75 and the panels in row V of FIG. 76 ).

11.6 Clarifying Remarks

“ADiC-based filter” should be understood as a filter comprising an ADiC structure. For example, an ADiC-based filter may consist of a wideband linear lowpass filter followed by an ADiC or a CAF followed by a linear bandpass filter. As another example, in FIG. 75 the ADiC-based filter consists of a bandstop filter followed by an ADiC or a CAF followed by a linear lowpass filter.

As another example of an ADiC-based filter, an “ADiC-based decimation filter” should be understood as a decimation filter comprising an ADiC or a CAF structure. For example, it may consist of a digital ADiC or a CAF followed by a digital decimation filter.

FIG. 77 provides an example of a ΔΣ ADC with an ADIC-based decimation filter for mitigation of wideband impulsive noise affecting the baseband signal of interest in the presence of a strong adjacent-channel interference. In this example, the ADiC-based decimation filter consists of (i) a digital wideband filter followed by (ii) a digital ADiC/CAF followed by (iii) a digital decimation filter.

The wideband filter may, in turn, consist of a several cascaded filters. For example, for mitigation of wideband impulsive noise affecting the baseband signal of interest in the presence of a strong adjacent-channel interference, the wideband filter may consist of a wide-band lowpass filter cascaded with a bandstop filter for suppression of the adjacent-channel interference.

While conceptually the best implementation and use of ADiC-based filters may be in analog hardware, as discussed in this disclosure, inherently high (e.g. by two to three orders of magnitude higher than the Nyquist rate for the signal of interest) oversampling rate of a ΔΣ ADC may be used for a real-time, low memory, and computationally inexpensive “effectively analog” digital ADiC-based filtering during analog-to-digital conversion. Such numerical ADiC implementations may offer many advantages typically associated with digital processing, including simplified development and testing, on-the-fly configurability, reproducibility, and the ability to “train” (optimize) the ADiC parameters (e.g., using machine learning approaches). In addition, such an approach may simplify ADiC's integration into those existing systems that use ΔΣ ADCs for analog-to-digital conversion.

For example, FIG. 78 illustrates a direct conversion receiver architecture with quadrature baseband ADCs, where the ADiC-based filtering (using either complex-valued processing, or separate processing of the in-phase and quadrature components) may be performed early in the digital domain, immediately following ΔΣ modulators (e.g. 1-bit ΔΣ modulators). A high sampling rate of ΔΣ modulators would allow the use of relaxed analog filtering requirements, e.g. much wider antialiasing filter bandwidth. For instance, one may use a low-order Bessel filter with the 3 dB corner frequency that is an order of magnitude wider than that of the baseband, to provide a sufficient bandwidth margin along with preserving the shape of the interference's outliers.

FIG. 79 shows a generic example of a superheterodyne receiver architecture with incorporated ADiC-based filtering. In such a receiver, a baseband stage may amplify, filter, and then A/D convert the resulting in-phase and quadrature signals. After the A/D (performed, e.g., by 1-bit ΔΣ modulators), digital ADiC-based filtering may be performed to attenuate interferers before digital detection of the bit sequence is performed. Alternatively, the IF signal may be digitized by a single ADC (e.g. by a ΔΣ ADC) after which additional filtering (including ADiC filtering), quadrature downconversion to DC, and bit detection are performed in the digital domain.

One skilled in the art will recognize that a variety of electronic circuit topologies may be developed and/or used to implement the intended functionality of various ADiC structures. FIGS. 80, 81, and 82 outline brief examples of idealized algorithmic topologies for several ADiC sub-circuits based on the operational transconductance amplifiers (OTAs). Transconductance cells based on the metal-oxide-semiconductor (MOS) technology represent an attractive technological platform for implementation of such active nonlinear filters as ADiCs, and for their incorporation into IC-based signal processing systems. ADiCs based on transconductance cells offer simple and predictable design, easy incorporation into ICs based on the dominant IC technologies, small size, and can be used from the low audio range to gigahertz applications [56-59].

For example, FIG. 80 provides a conceptual schematic of a sub-circuit for an OTA-based implementation of a depreciator with the transparency function given by equation (30) and depicted in FIG. 20 .

FIG. 81 provides an example of an OTA-based squaring circuit (e.g. “SQ” circuit in FIG. 59 ) for a complex-valued signal.

FIG. 82 provides an example of a conceptual schematic of a sub-circuit for an OTA-based implementation of a depreciator with the transparency function depicted in FIGS. 57 and 59 and given by the following equation:

$\begin{matrix} {{\mathcal{T}_{\alpha^{2}}\left( {❘{z - \zeta}❘}^{2} \right)} = \left\{ {\begin{matrix} 1 & {{{for}{❘{z - \zeta}❘}} \leq \alpha} \\ \left( \frac{\alpha}{❘{z - \zeta}❘} \right)^{2} & {otherwise} \end{matrix}.} \right.} & (62) \end{matrix}$

One skilled in the art will recognize that various other OTA-based sub-circuits for different ADiC embodiments (e.g. implementing addition/subtraction, multiplication/division, absolute value, square root, and other linear and/or nonlinear functions) may be implemented using the approaches and the circuit topologies described, for example, in [60-63].

Note that if the DCLs χ(t) or ζ(t) in FIG. 44, 51 or 59 are established by filtering the signal x(t) or z(t) with a linear filter with the impulse response w(t) (i.e. as χ(t)=(w*x)(t) or ζ(t)=(w*z)(t)), having an effectively unity frequency response and an effectively constant group delay Δt>0 over the bandwidth of the signal of interest, they may be viewed as DCLs for the delayed signals x(t−Δt) or z(t−Δt). Then the difference signals for x(t−Δt) or z(t−Δt) (i.e. x(t−Δt)−χ(t) or z(t−Δt)−ζ(t)) may be obtained as the respective outputs of a bandstop filter with the impulse response δ(t−Δt)−w(t), where δ(x) is the Dirac δ-function [31].

12 Utilizing Pileup Effect and Intermittently Nonlinear Filtering in Synthesis of Low-SNR and/or Covert and Hard-to-Intercept Communication Links

To meet the undetectability requirement, in a steganographic system the stego signals should be statistically indistinguishable from the cover signals. For physical layer transmissions, it may perhaps be enhanced by requiring that the payload and the cover have the same bandwidth and spectral content, the same apparent temporal and amplitude structures, and that there are no explicit differences in the spectral and/or temporal allocations for the cover signals and the payload messages.

For a mixture of such signals, neither linear nor nonlinear filtering alone may separate the signals. Favorably, however, linear filtering may significantly, and differently, affect the temporal and amplitude structure of many natural and the majority of technogenic (man-made) signals. For example, such filtering may often convert the amplitude distribution of a pulse train from super-Gaussian into apparently Gaussian and/or sub-Gaussian, and vice versa. On the other hand, a nonlinear filter is capable of disproportionately affecting spectral densities of signals with distinct temporal and/or amplitude structures even when the signals have the same spectral content. Therefore, a proper synergistic combination of linear and nonlinear filtering may be employed to effectively separate such “indistinguishable” cover and stego signals.

12.1 Channel Noise as Cover Signal

The very existence of a detectable carrier (cover signal) may be a dead giveaway for the stego payload. For example, a simple presence of a sheet of paper implies the possibility of a message written in invisible ink. Therefore, the best steganography should be “carrier-less,” when the payload is covertly embedded into something “ever-present.” In the physical layer, such “ideal” and unidentifiable cover signal may be the channel noise. Such noise always includes the ever-present thermal noise as one of its components, and may also comprise other (in general, non-Gaussian) natural and/or technogenic (man-made) components. Then, if the stego payload “pretends” to be Gaussian, and its power is small enough to be well within the natural variations of the channel noise, any physically available band may be used to carry a virtually undetectable covert message.

In this disclosure, we describe an approach to physical-layer steganography where the transmitted low-power stego messages may be statistically indistinguishable from the Gaussian component of the channel noise (e.g. the thermal noise) observed in the same spectral band, and thus the channel noise itself may serve as an effective cover signal. We also demonstrate how the apparent spectral and temporal properties of transmitted additional, higher-power cover signals (including those using the existing communication protocols) may be made to match those of the low-power stego payload and the Gaussian noise, providing extra layers of obfuscation for both the cover and the stego messages. We further illustrate how a specific combination of linear and nonlinear filtering may be used for effective separation of the cover, payload, and/or “friendly jamming” signals even when all transmissions have effectively the same spectral characteristics as well temporal and amplitude structures, and when there are no explicit differences in the spectral and/or temporal allocations for the cover and the stego messages.

12.2 Mimicking Function of Pileup Effect

A pulse train p(t) may be simply a sum of pulses with the same shape (impulse response) w(t), same or different amplitudes a_(k), and distinct arrival times t_(k): p(t)=Σ_(k) a_(k)w(t−t_(k)). When the width of the pulses in a train becomes greater than the distance between them, the pulses may begin to overlap and interfere with each other. This is illustrated in FIG. 83 : For the same arrival times, the pulses in the sequence consisting of the narrow pulses w(t) remain separate, while the wider (more “spread out”) pulses g(t) are “piling up on top of each other.” In this example, w(t) and g(t) have the same spectral content, and thus the power spectral densities (PSDs) of the pulse sequences are identical. However, the “pileup effect” causes the temporal and amplitude structures of these sequences to be substantially different. For a random pulse train, when the ratio of the bandwidth and the pulse arrival rate becomes significantly smaller than the time-bandwidth product (TBP) of a pulse, the pileup effect may cause the resulting signal to become effectively Gaussian [43, e.g.], making it impossible to distinguish between the individual pulses.

Indeed, let {circumflex over (p)}(t) be an “ideal” pulse train: {circumflex over (p)}(t)=Σ_(k) a_(k)δ(t−t_(k)), where δ(x) is the Dirac δ-function [31]. The moving average of this ideal train in a boxcar window of width 2T may be represented by the convolution integral

$\begin{matrix} {{{\overset{\_}{\mathcal{p}}(t)} = {\int_{- \infty}^{\infty}{{ds}\frac{{\theta\left( {t + T} \right)} - {\theta\left( {t - T} \right)}}{2T}{\hat{\mathcal{p}}\left( {t - s} \right)}}}},} & (63) \end{matrix}$ where θ(x) is the Heaviside unit step function [30]. At any given time t_(i), the value of p(t_(i)) is proportional to the sum of a_(k) for the pulses that occur within the interval [t_(i)−T, t_(i)+T]. Then, if the amplitudes a_(k) and/or the interarrival times t_(k+1)−t_(k) are independent and identically distributed (i.i.d.) random variables with finite mean and variance, it follows from the central limit theorem (CLT) that the distribution of p(t_(i)) approaches Gaussian for a sufficiently large interval [−T, T].

If we replace the boxcar weighting function in (63) with an arbitrary moving window w(t), then (63) becomes a weighted moving average

$\begin{matrix} {{{\mathcal{p}}(t)} = {{\int_{- \infty}^{\infty}{{ds}{w(t)}{\hat{\mathcal{p}}\left( {t - s} \right)}}} = {{\left( {\hat{\mathcal{p}}*w} \right)(t)} = {\sum\limits_{k}{a_{k}{{w\left( {t - t_{k}} \right)}.}}}}}} & (64) \end{matrix}$ which is a “real” pulse train with the impulse response w(t). If w(t) is normalized so that ∫_(−∞) ^(∞)ds w(s)=1, w(t) is an averaging (i.e. lowpass) filter. Then, if w(t) has both the bandwidth and the time-bandwidth product (TBP) similar to that of the boxcar pulse of width 2T, the distribution of p(t_(i)) would be similar to that of p(t_(i)) (e.g. Gaussian for a sufficiently large T).

12.2.1 TBP of Filter in Context of Pileup Effect

There are various ways to define the “time duration” and the “bandwidth” of a pulse. This may lead to a significant ambiguity in the definitions of the TBPs, especially for filters with complicated temporal structures and/or frequency responses. However, in the context of a mimicking function of the pileup effect, our main concern is the change in the TBP that occurs only due to the change in the temporal structure of a filter, without the respective change in its spectral content. For a single pulse w(t), its peak-to-average power ratio (PAPR) may be expressed as

$\begin{matrix} {{PAPR}_{w} = {\frac{\max\left( {w^{2}(t)} \right)}{\frac{1}{T_{2} - T_{1}}{\int_{T_{1}}^{T_{2}}{{dt}{w^{2}(t)}}}}.}} & (65) \end{matrix}$ where the interval [T₁, T₂] includes the effective time support of w(t). Then for filters with the same spectral content and the impulse responses w(t) and g(t), the ratio of their TBPs may be expressed as the reciprocal of the ratio of their PAPRs,

$\begin{matrix} {{\frac{{TBP}_{g}}{{TBP}_{w}} = {\frac{\max\left( {w^{2}(t)} \right)}{\max\left( {g^{2}(t)} \right)} = \frac{{PAPR}_{w}}{{PAPR}_{g}}}},} & (66) \end{matrix}$ where the PAPRs are calculated over a sufficiently long time interval that includes the effective time support of both filters.

Note that from (66) it follows that, among all possible pulses with the same spectral content, the one with the smallest TBP would contain a dominating large-magnitude peak. Hence any reasonable definition of a finite TBP for a particular filter with a given frequency response may allow us to obtain comparable numerical values for the TBPs of all other filters with the same frequency response, regardless of their temporal structures. For example, defining the “time duration” of the pulses g₁(t) and g₂(t) shown in FIG. 84 may be challenging. On the other hand, a “reasonable” definition of the duration of the root-raised-cosine pulse w(t) may be given as 2T_(s), where T_(s) is the reciprocal of the symbol-rate parameter of the pulse. Then defining the bandwidth by the 3 dB corner frequency (i.e. ΔB=(2T_(s))⁻¹) leads to TBP_(w)=1.

Given a “seed” pulse w(t), perhaps the easiest way to construct a pulse g(t) with the same spectral content but a different TBP is to filter w(t) with an all-pass filter, for example, a linear or nonlinear chirp with a flat frequency response. Then the convolutions of w(t) and g(t) with their respective matched filters (i.e. their “combined” impulse responses) would be automatically identical. For example, the pulses g₁(t) and g₂(t) shown in FIG. 84 are obtained by convolving the root-raised-cosine pulse w(t) with two different nonlinear chirps. While w(t), g₁(t), and g₂(t) have significantly different TBPs, their convolutions with the respective matched filters produce the same raised-cosine pulse (w*w)(t).

We would like to mention in passing that the same approach may be used to construct multidimensional pairs of matched filters with identical spectral characteristics but significantly different time and/or spatial supports. Such filters, for example, may be spatial 2D (g_(i)(x, y)) and/or spatio-temporal 3D (g_(i)(x, y, t)) filters for image and video processing. This is illustrated in FIG. 85 for 2D filters.

12.2.2 Convolution with Large-TBP Filter as Gaussian Mimic Function

FIG. 86 illustrates how the pileup effect may be used to obscure (e.g. to mimic as Gaussian or sub-Gaussian) a large-PAPR (super-Gaussian) transmitted signal, while fully recovering its distinct temporal and amplitude structure in the receiver. In this example, convolution of the pulse train with a large-TBP filter in the transmitter “hides” its original structure, and the pulses with larger TBPs perform this more effectively. This may be seen in FIG. 86 from both the time-domain traces and the normal probability plots shown in the lower left corner. For a sufficiently large TBP, the distribution of the filtered pulse train becomes effectively Gaussian, making it impossible to distinguish between the individual pulses.

The filters g_(i)(t) in FIG. 86 are obtained by filtering the root-raised-cosine pulse w(t) with different all-pass filters, and thus they have the same frequency responses. While w(t) and g_(i)(t) have significantly different TBPs, their convolutions with the respective matched filters produce the same raised-cosine pulse (w*w)(t). Hence, in the receiver, filtering with a respective matched filter effectively restores the train's original temporal and amplitude structure.

12.3 Pulse Trains for Low-SNR Communications

For sufficiently low pulse rate

(e.g. below half of the bandwidth for TBP=1), the PAPR of a pulse train is inversely proportional to

, and the magnitude of the pulses in a train of a given power may be made arbitrarily large by reducing the pulse rate. Thus a pulse train consisting of pulses with a small TBP may be effectively used for low-SNR communications, when the Shannon's upper limit on the channel capacity [44] is itself below the bandwidth.

For the most effective use of the pileup effect for conversion of a high-PAPR pulse train with a distinct, super-Gaussian temporal and amplitude structure into an effectively Gaussian signal, by filtering the train with a large-TBP filter, the pulse train needs to be randomized. This may be accomplished by randomizing the amplitude of the pulses in the train, their arrival times, or both. The ways in which the pulse train is randomized affect the ways in which the information may be encoded and retrieved. For example, if the timing structure of the pulse train is known, synchronous pulse detection may be used. Otherwise, one may need to employ an asynchronous pulse detection (e.g. pulse counting). This, in turn, affects the capacity of the channel.

12.3.1 Pulse Counting Vs. Synchronous Pulse Detection

Let us consider a pulse train consisting of pulses with the bandwidth ΔB and a small TBP, so that a single large-magnitude peak in a pulse dominates, and assume that the arrival rate

of the pulses is sufficiently small so that pileup is negligible (e.g

<<½ΔB/TBP). When the arrival time of a pulse with the peak amplitude A>0 is known, the probability of detecting this pulse as positive in the presence of Gaussian noise with zero mean and the variance σ_(n) ² may be expressed as

$\frac{1}{2}{erfc}{\left( \frac{- A}{\sigma_{n}\sqrt{2}} \right).}$ Then the pulses with the amplitude A>σ_(n)√{square root over (2)}erfc⁻¹(2ε) would have a pulse identification error rate smaller than ε. For example, ε≲1.3×10⁻³ for A≲3σ_(n), and ε≲3.2×10⁻⁵ for A≳4σ_(n).

In pulse counting, a pulse is detected when it crosses a certain threshold. A false positive detection occurs when such crossing is entirely due to noise, and a false negative detection happens when a pulse affected by the noise fails to cross the threshold. For a positive threshold α₊>0, the false negative rate would be smaller than e if the amplitude of a pulse is A>α₊+σ_(n)√{square root over (2)}erfc⁻¹(2ε).

As shown in [46, 47], for a filtered noise with zero mean and the variance σ_(n) ², its rate of up-crossing the threshold α₊>0 may be expressed as

_(max) exp(−½(α₊/σ_(n))2), where the saturation rate

_(max) is determined entirely by the filter's frequency response. Then, for the average pulse arrival rate

, the threshold value needs to be

$\alpha_{+} > {\sigma_{n}\left\lbrack {{- 2}{\ln\left( {{\varepsilon\mathcal{R}}/\mathcal{R}_{\max}} \right)}} \right\rbrack}^{\frac{1}{2}}$ in order to keep the se positive rate below ε. For example, for

/

_(max)= 1/10, α₊≳4.3σ_(n) for ε=10⁻³, and α₊≳4.8σ_(n) for ε=10⁻⁴. Note that for an ideal “brick wall” lowpass filter with the bandwidth ΔB the saturation rate

_(max)=ΔB/√{square root over (3)} [46]. Hence, for example, for a root-raised-cosine or a raised-cosine filter

_(max)≈(2T_(s)√{square root over (3)})⁻¹, where T_(s) is the reciprocal of the symbol-rate parameter of the filter.

For a pulse rate

that is sufficiently smaller than

₀=½ΔB/TBP, the PAPR of a train of equal-magnitude pulses is inversely proportional to R. This is illustrated in the left panel of FIG. 87 for a pulse train consisting of root-raised-cosine pulses. Then, for a given signal-to-noise ratio (SNR) of a pulse train affected by additive Gaussian noise, and for a given error rate constraint ε, the pulse rate needs to be sufficiently small to ensure the pulse detection with the error rate below ε. This is illustrated in the right panel of FIG. 87 , for both pulse counting and synchronous pulse detection, for 10⁻²≤ε≤10⁻³ and a pulse train consisting of root-raised-cosine pulses. For example, as shown in this panel, for the SNR equal to −10 dB the upper rate limits for 10⁻²≤ε≤10⁻³ are approximately (2.8-4.1)×10⁻³ΔB for pulse counting, and (2.5-4.5)×10⁻²ΔB for synchronous pulse detection, where ΔB is the bandwidth of the signal. For comparison, the Shannon upper limit on channel capacity [44] is shown by the dashed line.

While the rate limit for pulse counting is approximately an order of magnitude lower than for synchronous pulse detection, pulse counting does not rely on any a priori knowledge of pulse arrival times, and may be used as a backbone method for pulse detection. Thus it is used in all subsequent examples of this disclosure. In practice, both pulse counting and synchronous pulse detection may be used in combination. For example, given a constraint on the total power of the pulse train, counting of relatively rare, higher-amplitude pulses may be used to establish the timing patterns for synchronization, and synchronous detection of smaller, more frequent pulses may be used for a higher data rate.

12.4 Intermittently Nonlinear Filtering (INF) for Outlier Mitigation and Pulse Counting

In general, a nonlinear filter is capable of disproportionately affecting spectral densities of signals with distinct temporal and/or amplitude structures even when these signals have the same spectral content. In particular, the separation of a large-PAPR pulse train and a small-PAPR signal may be viewed as either (i) mitigation of impulsive noise affecting the small-PAPR signal, or (ii) extraction of impulsive signal from the small-PAPR background. In the examples below, a specific type of Intermittently Nonlinear Filters (INF) is used to accomplish either or both tasks. While various INF configurations, their different uses, and the approaches to their analog and/or digital implementations are described previously in this disclosure (e.g. under such names as ABAINF, CMTF, ADiC, or CAF), FIG. 88 illustrates their basic concept. In an INF, the upper and the lower fences establish a robust range that excludes high-amplitude pulses while effectively containing the small-PAPR component. The prime INF output simply contains the input signal in which the outliers (i.e. the pulses that protrude from the range) are replaced with mid-range values. This constitutes mitigation of impulsive noise affecting the small-PAPR signal. The auxiliary INF output is the difference between its input and the prime output. This is akin to extraction of impulsive signal from the small-PAPR background (or “pulse counting”).

12.4.1 Robust Range/Fencing in INF

For an INF to be effective in separation of small-PAPR and impulsive signals regardless of their relative powers, its range needs to be robust (insensitive) to the pulse train. Favorably, for a mixture of a small-PAPR signal with bandwidth ΔB, and a pulse train with the same bandwidth and the rate sufficiently below

₀, when the pileup effect is insignificant, the value of the interquartile range (IQR) of the mixture is insensitive to the power of the pulse train. This is illustrated in FIG. 89 for a pulse train affected by additive Gaussian noise. Thus robust upper (α₊) and lower (α⁻) fences for INF may be constructed as linear combinations of the 1st (Q_([1])) and the 3rd (Q_([3])) quartiles of the signal (Tukey's fences [48]) obtained in a moving time window: [α⁻,α₊]=[Q _([1])−β(Q _([3]) −Q _([1])),Q _([3])+β(Q _([3]) −Q _([1]))],  (67) where α₊, α⁻, Q_([1]), and Q_([3]) are time-varying quantities, and β is a scaling parameter of order unity. When an INF is used for pulse counting in the presence of additive Gaussian noise, the particular value of β should be chosen based on the constraint on the relative rate e of false positive detections. Then, as follows from the discussion in Section 12.3.1,

$\begin{matrix} {\beta \approx {{1.05 \times \sqrt{\ln\left( \frac{\mathcal{R}_{\max}}{\varepsilon\mathcal{R}} \right)}} - {\frac{1}{2}.}}} & (68) \end{matrix}$ For example, for

/

_(max)= 1/10, β≈2.7 for ε=10⁻³, and β≈3.1 for ε=10⁻⁴.

12.4.2 Quantile Tracking Filters (QTFs) for Robust Fencing

As a practical matter, Quantile Tracking Filters (QTFs) described earlier in this disclosure are an appealing choice for such robust fencing in INF, as QTFs are analog filters suitable for wideband real-time processing of continuous-time signals and are easily implemented in analog circuitry. Further, their numerical computations are

(1) per output value in both time and storage, which also enables their high-rate digital implementations in real time.

In brief, the signal Q_(q)(t) that is related to the given input x(t) by the equation

$\begin{matrix} {{{\frac{d}{dt}Q_{q}} = {\mu\left\lbrack {{\lim\limits_{\varepsilon\rightarrow 0}{\mathcal{S}_{\varepsilon}\left( {x - Q_{q}} \right)}} + {2q} - 1} \right\rbrack}},} & (69) \end{matrix}$ where μ is the rate parameter and 0<q<1 is the quantile parameter, may be used to approximate (“track”) the q-th quantile of x(t) for the purpose of establishing a robust range [α⁻, α₊]. In (69), the comparator function

_(ε)(x) may be any continuous function such that

_(ε)(x)=sgn(x) for |x|>>ε, and

_(ε)(x) changes monotonically from “−1” to “1” so that most of this change occurs over the range [−ε, ε]. For a continuous stationary signal x(t) with a constant mean and a positive IQR, the outputs Q_([1])(t) and Q_([3])(t) of QTFs with a sufficiently small rate parameter μ would approximate the 1st and the 3rd quartiles, respectively, of the signal obtained in a moving boxcar time window with the width ΔT of order 2×IQR/μ>>

ƒ

⁻¹, where

ƒ

is the average crossing rate of x(t) with the 1st and the 3rd quartiles of x(t). Consequently, as illustrated in FIG. 90 , the overall behavior of the QTF fencing for a stationary constant-mean signal with a given IQR would be similar to the fencing with the “exact” quartile filters in a moving boxcar window [θ(t)−θ(t−ΔT)]/ΔT, where ΔT=2×IQR/μ and μ is the QTF rate parameter. However, for a sampling rate F_(s), numerical computations of an “exact” quartile require

(F_(s)ΔT log(F_(s)ΔT)) per output value in time, and

(F_(s)ΔT) in storage, becoming prohibitively expensive for high-rate real-time processing.

12.5 Illustrative Examples

Let us now provide several particular illustrations of utilizing the pileup effect and synergistic combinations of linear and intermittently nonlinear filtering for synthesis of covert and hard-to-intercept communication links.

12.5.1 Message Sent by Pulse Train Pretending to be Thermal Noise

FIG. 91 depicts the basic concept of the first example. The transmitted low-power payload signals are statistically indistinguishable from the Gaussian component of the channel noise (e.g. the thermal noise) observed in the same spectral band, and therefore the channel noise itself serves as a sole cover signal. Further, FIG. 92 provides a detailed particular illustration for the basic concept highlighted in FIG. 91 . Here, the message is encoded in a pulse train by both the polarity of the pulses and their interarrival times. (We only show the asynchronous detection (pulse counting) performed by obtaining the auxiliary output of an INF. If the rules for the interarrival times are known, synchronous pulse detection can also be used.) To make this example more realistic, in the transmitter and the receiver we use both digital finite impulse response (FIR) as well as analog (hardware) infinite impulse response (IIR) filters, and include into consideration the respective digital-to-analog (D/A) and analog-to-digital (A/D) conversions. For example, in an underwater acoustic communication system w₁(t) may represent the response of the speaker in the transmitter, and w₂(t)—the response of the hydrophone in the receiver.

The channel noise used in the simulation is additive white Gaussian noise (AWGN), and its power is chosen to lead to the −10 dB SNR in the passband of the receiver. Note that the noise may also contain, in addition to Gaussian, a strong outlier component. For example, in underwater acoustic communications it may contain strong impulsive noise produced by snapping shrimp [1-3]. In this case, an additional INF may be deployed before applying the filter g₁₁(t) in the receiver (e.g. at point N), to mitigate this noise component and to increase the apparent SNR.

12.5.2 Further Obscuring Low-SNR Payloads

For a stego pulse train with a given rate, further increasing the power of the channel noise (say, by 10 dB) may make the pulse train undetectable. For example, when the pulse rate is higher than the Shannon limit for the given SNR, neither synchronous nor asynchronous detection would be possible (see Section 12.3.1). However, such increase in the channel noise power may be accomplished by an additional pulse train, simply disguised as Gaussian. Then an INF in the receiver, in combination with the respective “de-mimicking” filter, may effectively remove this additional noise, enabling the detection of the low-power payload. In addition, the higher-power pulse train may itself carry a lower-security (or decoy) message, and/or the timing information that enables synchronous pulse detection in the stego pulse train. Recovering this information from the “extra cover” signal would still require knowledge of the respective mimic filter used by the transmitter. This concept is schematically illustrated in FIG. 93 , and FIGS. 94 and 95 provide its detailed walk-through example. Note that even after the effective removal of the higher-SNR pulse train from the mixture (by the first INF), the stego message is still Gaussian, and still hidden behind the channel noise (and the remainder of the decoy/timing/“extra cover” signal). Thus its recovery still requires knowledge of the second mimic filter (g₁₂(t)) used by the transmitter.

Filter properties. The main properties of the filters used in this example are listed in the lower right panel of FIG. 95 , and the impulse responses of these filters and their convolutions are illustrated in FIG. 96 . In construction of these filters, we used the approach briefly outlined in Section 12.2.1. In general, given the smallest-TBP filter g₀(t) with a particular frequency response, one may construct a great variety of filters g_(i)(t) with the same frequency response but much larger TBPs (e.g., orders of magnitude larger). These filters may be constructed in such a way that (i) their combined matched responses are equal to each other, g_(i)(t)*g_(i)(−t)=g_(j)(t)*g_(j)(−t) for any i and j, and have a small TPB, but (ii) the convolutions of any g_(i)(t) with itself (for i≠0), or with g_(j)(±t) (for i≠j) have large TBPs. For a given “seed” pulse g₀(t), perhaps the easiest way to construct a pulse g_(i)(t) with a different TBP is to filter g₀(t) with an all-pass filter, for example, a linear or nonlinear chirp with a flat frequency response.

12.5.3 Friendly In-Band Jamming

In our third example, the main message is transmitted using one of the existing communication protocols, but its temporal and amplitude structure is obscured by employing a large-TBP filter in the transmitter, e.g., made to be effectively Gaussian. This alone provides a certain level of security, since the intersymbol interference may become excessively large and the signal may not be recovered in the receiver without the knowledge of the mimic filter. In addition, a jamming pulse train, disguised as Gaussian by another (and different) large-TBP filter, is added to the main signal. This jamming signal has effectively the same spectral content as the main signal, and its power is sufficiently large (e.g. similar to the main signal) so that the main signal is unrecoverable even if the first mimic filter is known. In the receiver, the jamming pulse train is removed from the mixture (and recovered, if it itself contains information), enabling the subsequent recovery of the main message. This concept is schematically illustrated in FIG. 97 .

OFDM PAPR reduction. In addition to improved security, applying a large-TBP filter to the main signal reduces PAPR of large-crest-factor signals such as those in orthogonal frequency-division multiplexing (OFDM), as illustrated in FIG. 98 . Here, the simulated OFDM signals are generated without restrictions of the proportion of “ones” and “zeros” in a symbol, and thus they have the maximum achievable PAPRs (i.e. 2N, where N is the number of carriers).

Walk-through example. In FIG. 99 , the main signal is a high-PAPR OFDM signal, and the jamming signal is a high-PAPR impulse train with the spectral content in an effectively the same band (see the frequency responses of the filters in the lower left panel of FIG. 99 ). After the filtering with large-TBP filters g(t) and h(t), respectively, both the OFDM and the jamming signals become effectively Gaussian, and so does their mixture that is being transmitted and received (see the black line in the normal probability plots shown in the lower middle panel of FIG. 99 ). In this example, the channel noise is assumed to be relatively small and is not shown. However, applying a filter matched for h(t) in the receiver restores the high-PAPR structure of the jamming signal (see the respective line in the normal probability plots), while the OFDM component remains Gaussian. Subsequently, the INF accomplishes both the mitigation of the jamming pulse train affecting the OFDM component and the extraction of the jamming signal. Applying the filter {tilde over (g)}(t) to the prime INF output effectively restores the original high-PAPR OFDM signal. If desired, the jamming pulse train is restored by applying the filter w₂(t) to the auxiliary INF output.

12.6 Pulse Trains for Low-SNR Communications

Let us consider a pulse train consisting of pulses with the bandwidth ΔB and a small TBP, so that a single large-magnitude peak in a pulse dominates, and assume that the arrival rate

the pulses is sufficiently small so that pileup is negligible (e.g.

<<

₀=½ΔB/TBP). When the arrival time of a pulse with the peak magnitude |A| is known, the probability of correctly detecting the polarity of this pulse in the presence of additive white Gaussian noise (AWGN) with zero mean and n variance may be expressed, using the complementary error function as

$\frac{1}{2}{erfc}{\left( \frac{- {❘A❘}}{\sigma_{n}\sqrt{2}} \right).}$ Then the pulses with the magnitude |A|>σ_(n)√{square root over (2)}erfc⁻¹(2ε) would have a pulse identification error rate smaller than ε. For example, ε≲1.3×10⁻³ for |A|≳3σ_(n), and ε≲3.2×10⁻⁵ for |A|≳4σ_(n).

The pulse rate in a digitally sampled train with regular (periodic) arrival times is

=F_(s)/N_(p), where F_(s) is the sampling frequency and N_(p) is the number of samples between two adjacent pulses in the train. For

that is sufficiently smaller than

₀, the PAPR of a train of equal-magnitude pulses with regular arrival times is an increasing function of the number of samples between two adjacent pulses N_(p), and would be proportional to N_(p): PAPR=PAPR(N _(p))∝N _(p) for large N _(p).  (70) For example, for raised-cosine (RC) pulses

₀≈(4T_(s))⁻¹, where T_(s) is the symbol-period, and a “large N_(p)” would mean N_(p)>>T_(s)F_(s)=N_(s), where N_(s) is the number of samples per symbol-period. As illustrated in FIG. 100 , PAPR(N_(p))≈1.143 N_(p)/N_(s) for N_(p)/N_(s)>>1 for RC pulses with roll-off factor β=½.

From the lower limit on the magnitude of a pulse for a given uncoded bit error rate (BER),

$\begin{matrix} {{{❘A❘} = {{\sigma_{n}\sqrt{{SNR} \times {PAPR}}} > {\sigma_{n}\sqrt{2}{{erfc}^{- 1}\left( {2 \times {BER}} \right)}}}},} & (71) \end{matrix}$ we may then obtain the lower limit on the SNR for a given pulse rate:

$\begin{matrix} {{{{SNR}\left( {N_{p};{BER}} \right)} > \frac{{2\left\lbrack {{erfc}^{- 1}\left( {2 \times {BER}} \right)} \right\rbrack}^{2}}{{PAPR}\left( N_{p} \right)} \propto N_{p}^{- 1}},{or}} & (72) \end{matrix}$ $\begin{matrix} {{{SNR}\left( {N_{p};{BER}} \right)} \gtrsim {{1.75\left\lbrack {{erfc}^{- 1}\left( {2 \times {BER}} \right)} \right\rbrack}^{2}\frac{N_{s}}{N_{p}}}} & (73) \end{matrix}$ for N_(s)/N_(p)<<1 and RC pulses with β=½. For example, SNR(N_(p); 10⁻³)≳9.6/PAPR(N_(p))≈8.4 N_(s)/N_(p), and SNR(N_(p); 10⁻⁵)≳18.2/PAPR(N_(p))≈15.9 N_(s)/N_(p).

FIG. 101 illustrates the SNR limits for different BER as functions of samples between pulses for RC pulses with β=½ and N_(s)=2. For example, for the pulses separated by 128 symbol-periods, BER≲10⁻³ is achieved for SNR≳−12 dB. For comparison, the AWGN Shannon capacity limit [44] for the bandwidth W=F_(s)/(2N_(s)), which is the nominal bandwidth of the respective RRC filter, is also shown.

12.6.1 Means for Synchronous Detection

To enable synchronous detection for a train x[k] with the pulses separated by N_(p) samples, the following modulo power averaging (MPA) function may be constructed as an exponentially decaying average of the instantaneous signal power x²[k] in a window of size N_(p)+1:

$\begin{matrix} {{{\overset{\_}{p}\left\lbrack {{i;k_{j - 1}},M} \right\rbrack} = {{\frac{M - 1}{M}{\overset{\_}{p}\left\lbrack {{i;k_{j - 2}},M} \right\rbrack}} + {\frac{1}{M}{\sum\limits_{k}{{{{x^{2}\lbrack k\rbrack}〚{k \geq {k_{j - 1} - N_{p}}}〛}〚{k \leq k_{j - 1}}〛}〚{i = {{mod}\left( {k,N_{p}} \right)}}〛}}}}},} & (74) \end{matrix}$ where k_(j) if the sample index of the j-th pulse, and M>1. In (74), the double square brackets denote the Iverson bracket [64]

$\begin{matrix} {{〚P〛} = \left\{ {\begin{matrix} 1 & {{if}P{is}{true}} \\ 0 & {otherwise} \end{matrix},} \right.} & (75) \end{matrix}$ where P is a statement that may be true or false. Thus the window k_(j−1)−N_(p)≤k≤k_(j−1) includes two transmitted pulses, k_(j−2) and k_(j−1), and the index i in p[i; k_(j−1), M] takes the values i=0, . . . , N_(p)−1. Note that using exponentially decaying average in (74) would roughly correspond to averaging N=2M−1 of such windows. The exponentially decaying average, however, has the advantage of lower computational and memory burden, especially for large M, and faster adaptability to dynamically changing conditions.

For a sufficiently large M the peak in p[i; k_(j−1), M] corresponding to the pulses of the pulse train would dominate. Therefore, the index k_(j) for sampling of the j-th pulse may be obtained as k _(j) =i _(max) +jN _(p),  (76) where i _(max) is given implicitly by p [i _(max) ;k _(j−1) ,M]=max( p [i;k _(j−1) ,M]).  (77)

FIG. 102 illustrates this synchronization procedure. The MPA function shown in the right-hand side of the figure is computed according to (74). To emphasize the robustness of this synchronization technique even when the bit error rates are very high, the SNR is chosen to be respectively low (SNR=−20 dB, BER≈⅓).

For the link shown in FIG. 107 , FIG. 103 compares the calculated (dashed lines) and the simulated (markers connected by solid lines) BERs, for the “ideal” synchronization (dots), and for the synchronization with the MPA function described above. The AWGN noise is added at the receiver input, and the SNR is calculated at the output of the matched filter in the receiver. One can see that for M=2 (asterisks) the errors in synchronization are relatively high, which increases the overall BER, but the MPA function with M=8 (crosses) provides reliable yet still fast synchronization. The BERs and the respective SNRs in FIG. 103 are presented for the pulse repetition rates indicated by the vertical dashed lines in FIG. 101 .

When a pulse train is used for communications rather than, say, radar applications, reliable synchronization may only need to be achievable for relatively low BER, e.g. BER≲ 1/10. Then the following modulo magnitude averaging (MMA) function may replace the MPA function in the synchronization procedure, in order to reduce the computational burden by avoiding squaring operations:

$\begin{matrix} {{\overset{\_}{a}\left\lbrack {{i;k_{j - 1}},M} \right\rbrack} = {{\frac{M - 1}{M}{\overset{\_}{a}\left\lbrack {{i;k_{j - 2}},M} \right\rbrack}} + {\frac{1}{M}{\sum\limits_{k}{{{{{{❘x❘}\lbrack k\rbrack}〚{k > {k_{j - 1} - N_{p}}}〛}〚{k \leq k_{j - 1}}〛}〚{i = {{mod}\left( {k,N_{p}} \right)}}〛}.}}}}} & (78) \end{matrix}$ Note that the window k_(j−1)−N_(p)<k≤k_(j−1) in (78) includes only the (j−1)-th transmitted pulse, instead of two pulses used in (74).

When a correct synchronization has already been obtained, and the maxima are “locked” at the correct i_(max) values, both the MPA and the MMA functions would adequately maintain the position of their maxima. However, an offset in the synchronization (e.g. by n points) significantly more unfavorably affects the margin between the extrema at i_(max) and i_(max)+n in the MMA function, compared with the MPA function. Thus the “extra point” may cause the “failure to synchronize” even at a relatively high SNR, and it should be removed from the calculation of the MMA function. Then, as illustrated in FIG. 104 , for BER≲ 1/10 synchronization with the MMA function ā[i; k_(j−1), M] would be effectively equivalent to synchronization with the MPA function p[i; k_(j−1), M]. When reliable synchronization for larger BERs is desired (e.g. in timing and ranging applications), then the MPA given by (74) should be used.

One skilled in the art will recognize that various other modulo averaging functions may be used as means for synchronous detection.

For example, the coincidence pulse detection (CPD) function cpd[k] takes the value “1” if at k there is a local maximum of x[k] that is above α_(k) ⁺, or a local minimum that is below α_(k) ⁻. Otherwise, cpd[k] is zero:

$\begin{matrix} {{{cpd}\lbrack k\rbrack} = {{{〚{x_{k} > \alpha_{k}^{+}}〛}〚{x_{k} > x_{k - 1}}〛}{{{〚{x_{k} \geq x_{k + 1}}〛} + {{{{〚{x_{k} < \alpha_{k}^{-}}〛}〚{x_{k} < x_{k - 1}}〛}〚{x_{k} \leq x_{k + 1}}〛}.}}}}} & (79) \end{matrix}$

If the transmitted pulse rate is

=F_(s)/N_(p)<<F_(s), where F_(s) is the sample rate, then N_(p) is the number of samples between two adjacent pulses in the train. To enable synchronous pulse detection in the receiver, the following modulo count averaging (MCA) function may be constructed by the “modulo accumulation” of the values of the pulse detection function in a window of size MN_(p)+1 that includes M+1 transmitted pulses:

$\begin{matrix} {{{\overset{\_}{c}\left\lbrack {{i;k_{j - 1}},M} \right\rbrack} = {\sum\limits_{k}{{{{{cpd}\lbrack k\rbrack}〚{k \geq {k_{j - 1} - {MN}_{p}}}〛}〚{k \leq k_{j - 1}}〛}〚{i = {{mod}\left( {k,N_{p}} \right)}}〛}}},} & (80) \end{matrix}$ where k_(j) if the sample index of the j-th pulse. Note that in (80) the index i takes the values i=0, . . . , N_(p)−1. To reduce computations and memory requirements when M>>1, the MCA function can also be calculated as an exponential moving average:

$\begin{matrix} {{\overset{\_}{c}\left\lbrack {{i;k_{j - 1}},M} \right\rbrack} = {{\frac{M - 1}{M}{\overset{\_}{c}\left\lbrack {{i;k_{j - 2}},M} \right\rbrack}} + {\frac{1}{M}{\sum\limits_{k}{{{{{{cpd}\lbrack k\rbrack}〚{k \geq {k_{j - 1} - N_{p}}}〛}〚{k \leq k_{j - 1}}〛}〚{i = {{mod}\left( {k,N_{p}} \right)}}〛}.}}}}} & (81) \end{matrix}$

12.7 Summary and Additional Comments

The main results of Section 12 so far may be summarized as follows:

1—Pileup effect may be used for modifying the temporal and amplitude structure of various non-Gaussian signals, and, in many cases, for making them appear as effectively Gaussian. For example, a highly super-Gaussian pulse train consisting of pulses with random amplitudes and/or interarrival times may be converted into an effectively Gaussian or sub-Gaussian by a convolution with a filter having a sufficiently large time-bandwidth product (TBP). Such “mimicking” of a pulse train as Gaussian noise may be achieved without modifying the spectral content of the train.

2—Given the smallest-TBP filter g₀(t) with a particular frequency response, one may construct a great variety of filters g_(i)(t) with the same frequency response but much larger TBPs (e.g., orders of magnitude larger). These filters may be constructed in such a way that (i) their combined matched responses are equal to each other, g_(i)(t)*g_(i)(−t)=g_(j)(t)*g_(j)(−t) for any i and j, and have a small TPB, but (ii) the convolutions any of g_(i)(t) with itself (for i≠0), or with g_(j)(±t) (for i≠j) have large TBPs.

There are multiple ways to construct pulses with identical frequency responses yet significantly different TBPs. For example, for a given “seed” pulse g₀(t), one of the ways to construct a pulse g_(i)(t) with a different TBP may be to filter g₀(t) with an all-pass filter. Such a filter, e.g., may be a linear or nonlinear chirp with a flat frequency response.

As another example, given a “seed” small-TBP pulse with finite (FIR) or infinite (IIR) impulse response w(t), a large-TBP pulse with the same spectral content may be “grown” from w(t) by applying a sequence of IIR allpass filters. Then an FIR filter for pulse shaping in the transmitter may be obtained by (i) placing w(t) at t=0, (ii) “spreading” it with an IIR allpass filter, (iii) truncating the pulse when it sufficiently decays to zero, and (iv) time-inverting the resulting waveform. Then applying the same IIR allpass filter in the receiver to this waveform would produce the matched filter to the original seed pulse, w(−t). In the illustration of FIG. 105 , the transmitter waveform is composed as a “piled-up” sum of thus constructed large-TBP pulses, scaled and time-shifted. In the receiver, an IIR allpass filter recovers the underlying high-PAPR pulse train. The seed w(t) used in this illustration is an FIR root-raised-cosine (RRC) pulse symmetrical around t=0, and thus (w*w)(t) is a raised-cosine (RC) pulse. RC pulses are perhaps not the best choice for shaping the pulse trains for communications, since their TBP is only about unity, and pulse shaping with Gaussian or Bessel filters (with TBP≈2 ln(2)/π≈0.44) may provide a better alternative. However, FIR RC pulses with a given roll-off factor β have well-defined bandwidth and convenient numerical values associated with their symbol-rate.

3—Matched filter pairs with similar properties (i.e. identical spectral characteristics but significantly different time and/or spatial supports) may also be constructed for multidimensional filters, for example spatial 2D (g_(i)(x, y)) and/or spatio-temporal 3D (g_(i)(x, y, t)) filters for image and/or video processing.

4—For sufficiently low pulse rate

(e.g. below half of the bandwidth for TBP=1), the PAPR of a pulse train would be inversely proportional to

, and the magnitude of the pulses in a train of a given power may be made arbitrarily large by reducing the pulse rate. Thus a pulse train consisting of pulses with a small TBP may be effectively used for low-SNR communications, when the Shannon's upper limit on the channel capacity is itself below the bandwidth. For example, if the timing structure of the pulse train is known, synchronous pulse detection may be used. Then, in the presence of additive Gaussian noise and for a train consisting of equal-magnitude pulses with unit TBP, the pulses with the arrival rates in the 25% to 50% range of the Shannon's limit for a given SNR may be detected with the raw error rate in the range 10⁻²≤ε≤10⁻³. Using proper modulation of the pulse train (e.g. in terms of the pulse amplitudes and their interarrival times), and error correction coding, the data rate capacity of a pulse train may be brought closer to the Shannon's limit.

5—When the pulse arrival times are unknown (e.g. the interarrival times are random), the asynchronous pulse detection (pulse counting) may be used. In pulse counting, a pulse is detected when it crosses a certain threshold, and this threshold needs to be sufficiently high to ensure a low rate of false positive detections. Therefore, to ensure a comparable to the synchronous pulse detection error rate, for pulse counting the pulse arrival rate needs to be reduced by about an order of magnitude, down to a few percent of the respective Shannon's rate. For example, to 56-82 kHz for a 20 MHz channel at −10 dB SNR and 10⁻²≤ε≤10⁻³, as compared to 500-900 kHz at the same SNR for synchronous detection. In practice, both pulse counting and synchronous pulse detection may be used in combination. For example, given a constraint on the total power of the pulse train, counting of relatively rare, higher-amplitude pulses may be used to establish the timing patterns for synchronization, and synchronous detection of smaller, more frequent pulses may be used for a higher data rate.

6—When each of two or more (say, N) pulse trains consists of identically shaped pulses, then, in general, their mixture may not be effectively separated back into the individual pulse trains. (That is, unless interference among the trains is negligible and a sufficient information about the pulse arrival times in the individual pulse trains is available.) However, before the mixing, one may filter each of the individual pulse trains with “its own” large-TBP g_(i)(t), i=1, . . . , N, so that the mixture becomes an effectively Gaussian signal due to pileup effect. One may then apply to the mixture the filter g_(i)(−t) such that the pulse g_(i)(t)*g_(i)(−t) has the smallest TBP for the given spectral content, but the convolutions g_(j)(t)*g_(i)(−t) for j≠i would still have sufficiently large TBPs so that the mixture of the remaining N−1 pulse trains remains a Gaussian signal. This filtered mixture may then be viewed as (i) a large-PAPR pulse train affected by additive Gaussian noise, or as (ii) an effectively Gaussian signal affected by impulsive noise.

7—In general, a nonlinear filter is capable of disproportionately affecting spectral densities of signals with distinct temporal and/or amplitude structures even when these signals have the same spectral content. In particular, the separation of a large-PAPR pulse train and a small-PAPR signal may be viewed as either (i) mitigation of impulsive noise affecting the small-PAPR signal, or (ii) extraction of impulsive signal from the small-PAPR background. In this disclosure, a specific type of Intermittently Nonlinear Filters (INF) may be used to accomplish either or both tasks. In such filtering, the upper and the lower fences establish a robust range that excludes high-amplitude pulses while effectively containing the small-PAPR component. The prime output of an INF would contain the input signal in which the outliers (i.e. the pulses that protrude from the range) are replaced with mid-range values. This would constitute mitigation of impulsive noise affecting the small-PAPR signal. The auxiliary INF output would be the difference between its input and the prime output. This would be akin to extraction of impulsive signal from the small-PAPR background (or “pulse counting”).

8—For an INF to be effective in separation of small-PAPR and impulsive signals regardless of their relative powers, its range needs to be robust (insensitive) to the pulse train. Favorably, for a mixture of a small-PAPR signal with bandwidth ΔB, and a pulse train with the same bandwidth and the rate sufficiently below

₀=½ΔB/TBP when the pileup effect is insignificant, the value of the interquartile range (IQR) of the mixture would be insensitive to the power of the pulse train. Thus robust upper and lower fences for INF may be constructed as linear combinations of the 1st and the 3rd quartiles of the signal (Tukey's fences) obtained in a moving time window. As a practical matter, Quantile Tracking Filters (QTFs) are an appealing choice for such robust fencing in INF, as QTFs are analog filters suitable for wideband real-time processing of continuous-time signals and are easily implemented in analog circuitry. Further, their numerical computations are

(1) per output value in both time and storage, which also enables their high-rate digital implementations in real time.

9—The very existence of a detectable carrier (cover signal) may be a dead giveaway for the stego payload. For example, a simple presence of a sheet of paper implies the possibility of a message written in invisible ink. Therefore, the best steganography should be “carrier-less,” when the payload is covertly embedded into something “ever-present.” In the physical layer, such “ideal” and unidentifiable cover signal would be the channel noise. Such noise would always include the ever-present thermal noise as one of its components, and may also comprise other (in general, non-Gaussian) natural and/or technogenic (man-made) components. Then, if the stego payload “pretends” to be Gaussian, and its power is small enough to be well within the natural variations of the channel noise, any physically available band may be used to carry a virtually undetectable covert message.

10—Further, Section 12 provides several detailed examples of applying the above concepts to synthesis of covert and hard-to-intercept communication links. These examples include (i) using the channel noise as a sole cover signal for a low-power payload, (ii) additional obfuscation of a low-power messages by strong decoy and/or auxiliary/timing signals, and (iii) “friendly” jamming by a signal with the same spectral content as the main signal that uses a standard protocol. All these examples rely on pileup effect for PAPR control, and on combinations of INF and linear filtering for effective separation of statistically indistinguishable, same-spectral-band cover and payload signals.

11—Note that when the channel noise itself contains an outlier component, an INF deployed early in the receiver chain may mitigate such outlier noise, increasing the overall SNR and the throughput capacity of all channels in the receiver.

One skilled in the art will recognize that the approach described in this disclosure allows for many practical variations, ranging from simple and easily implementable to more elaborate, highly secure multi-level configurations.

12.7.1 Additional Comments on Section 12

PAPR and K_(dBG) as measures of peakedness: The measure of peakedness of a signal used in Section 12 is PAPR. For deterministic waveforms, PAPR may be a reliable and consistent measure. However, PAPR may not be appropriate for quantifying peakedness of random signals, especially for large data sets, since sample maximum power is the least robust statistic and is maximally sensitive to outliers, By itself, a PAPR value does not quantify the frequency of occurrence of such outliers. For example, a sample of a random Gaussian signal may contain a large-magnitude outlier, leading to a deceptively large PAPR value. Therefore, instead of using a PAPR value directly, a probability that PAPR exceeds a certain threshold PAPR₀ is often used to describe peakedness of a random signal. Such probability is a function of PAPR₀ and not a statistic (a single value).

It may be more appropriate to measure the peakedness of a signal (e.g. of a pulse train) in terms of its kurtosis in relation to the kurtosis of the Gaussian (aka normal) distribution, as described in Section 4.3.2 (see equation (35)), using the units of “decibels relative to Gaussian” (dBG). According to this measure, a Gaussian distribution would have zero dBG peakedness, while sub-Gaussian and super-Gaussian distributions would have negative and positive dBG peakedness, respectively. In terms of the amplitude distribution of a signal, a higher peakedness compared to a Gaussian distribution (super-Gaussian) normally translates into “heavier tails” than those of a Gaussian distribution. In the time domain, high peakedness implies more frequent occurrence of outliers, that is, an impulsive signal.

FIG. 106 provides a comparative illustration of PAPR and K_(dBG) as measures of peakedness for pulse trains. As may be seen in the figure, K_(dBG) is less sensitive to outliers than PAPR, and is also more appropriate for quantifying peakedness of a pulse train at high pulse arrival rates. Thus, when increasing and/or decreasing of signal's peakedness is referenced, the use of a measure such as K_(dBG) may be assumed for quantification of peakedness.

For example, “low peakedness” may be understood as K_(dBG)≲3 dBG, and “high peakedness” may be understood as K_(dBG)≳6 dBG.

Modulation, demodulation, and other functions performed in transmitter and receiver: The examples in Section 12 show in detailed only processing/filtering of the baseband signals, whereas in a practical implementations of transmitters and/or receivers the signal processing chain may include various additional stages and components (e.g. antenna circuits, amplifiers, modulators and demodulators, mixers, various DSP modules, A/D and D/A converters, oscillators, clocks, input and output devices, etc.). For example, some of such components are indicated in FIGS. 1, 2, 21, 22, 26, 27, 32, 36, 38, 40, 42, 51 , FIGS. 68-70 , FIG. 75 , and FIGS. 77-79 of this disclosure. Such components are conventional features in various communication apparatus, and their detailed illustration is not essential for a proper understanding of the current invention.

In particular, a modulator is a device that performs modulation. A typical aim of modulation (e.g. digital modulation) is to transfer a band-limited signal (e.g. signal carrying analog or digital bit stream information) over a bandpass analog communication channel, for example, over a limited radio frequency band. A demodulator (or “detector”) is a device that performs demodulation, the inverse of modulation. A modem (from modulator/demodulator) may perform both operations. Modulators and/or demodulators are conventional features of various communication transmitters and/or receivers, and their detailed illustration is not essential for a proper understanding of the current invention.

FIG. 107 provides an illustration of an apparatus for low-SNR and/or covert communications, capable of conveying information from a transmitter to a receiver. In this illustration, the physical signal sent from the transmitter (TX) to the receiver (RX) is generated by modulating a carrier (the signal represented by the signal produced by the local oscillator LO) with the low-peakedness band-limited modulating signal that contains the intended information. For simplicity, only one component of such modulating signal is shown, and the modulating signal may comprise a plurality of different components. Also, in this figure (as well as for the simulation results discussed above and illustrated in FIG. 103 ) the analog amplitude modulation is used, while other types of modulation, analog as well as digital, may be used for generation of the physical communication signal.

In FIG. 107 , the information sent from TX to RX is encoded in the low-peakedness band-limited modulating signal. In this illustration, the information is contained in the “designed” pulse sequence (train) Σ_(i)A_(j)[[t=t_(i)]] shown in the lower left corner of the figure, and may be encoded in this designed pulse train by (i) the polarities of the pulses (i.e. sign(A_(i))), (ii) their magnitudes (i.e. |A_(i)|), and/or (iii) the time intervals between different pulses (i.e. t_(i)−t_(j)). To obtain the low-peakedness band-limited modulating signal, large-TBP pulse shaping is applied to the designed pulse train.

The physical signal is received by RX and the demodulated (e.g. baseband) signal is produced. As shown in FIG. 107 , this demodulated signal would comprise a component that is effectively proportional to the low-peakedness band-limited modulating signal in TX. Further, this component of the demodulated signal is converted into a high-peakedness band-limited pulse train that corresponds (e.g. in terms of the polarities, magnitudes, and/or time intervals among the pulses) to the designed pulse train, and thus contains the information encoded in the latter. In FIG. 107 , such conversion is accomplished by applying a large-TBP filter that is a matched filter to the filter used for pulse shaping in TX.

The intended information may then be extracted from the RX pulse train, by synchronous and/or asynchronous means. For example, the pulses in the RX pulse train may be sampled at their peaks (e.g. at t=t[k] when the CPD function given by (79) returns “1”, cpd[k]=1), thus providing the information about the pulses' polarities, magnitudes, and/or arrival times.

While in the examples of Section 12 the filtering operations are denoted by the asterisk as convolutions, it may not imply that there are any specific requirements imposed on the implementation of such filtering. For example, in FIGS. 86, 92, 94 and 99 it is shown that the transmitted waveform is generated through filtering (e.g. convolution) of a small-TBP pulse train with an impulse response of a large-TBP pulse. Instead, such transmitted waveform may be constructed as a simple sum of scaled and time-shifted/delayed large-TBP pulses (e.g., as Σ_(i)A_(i)g(t−t_(i)), where A_(i) and t_(i) are the amplitude and the arrival time of i-th pulse), and no explicit multiplication operations may be necessary for generation of such waveform. Then, for example, instead of using a numerical convolution with a high-order FIR filter, in the receiver the filtering may be performed by several cascaded low-order IIR allpass filters and a single low-order FIR filter, which may be significantly less computationally intensive. This is illustrated in FIG. 105 , where the transmitter waveform is constructed as a sum of scaled and time-shifted/delayed large-TBP pulses. In the receiver, an IIR allpass filter is used to recover the small-TBP pulse train.

As should be seen from FIG. 105 , the low-peakedness signal shown in the left and the high-peakedness pulse train shown in the right both encode the same information about the quantities of the “designed” pulse train Σ_(i)A_(i)[[t=t_(i)]]: (i) the polarities of the pulses (i.e. sign(A_(i))), (ii) their magnitudes (i.e. |A_(i)|), and (iii) the time intervals between different pulses (i.e. t_(i)−t_(j)). However, this information may be difficult to recover directly by sampling the low-peakedness signal, since these quantities are mutually coupled through the convolution with a large-TBP filter (pileup). On the other hand, the polarities, magnitudes, and/or the time intervals among the pulses of the designed pulse train may be easily obtained from the measuring said quantities in the high-peakedness pulse train shown in the right of FIG. 105 .

13 Communicating Over Longer Distances at Lower Power and Energy Dissipation

Another object of the present invention is data communications and, in particular, communicating over longer distances at lower power and energy dissipation. For example, in low-power wide-area networks (LPWANs), various trade-offs among the bandwidth, data rates, and energy per bit may have different effects on the quality of service under different propagation conditions (e.g. fading and multipath), Doppler spreads, interference scenarios, multi-user requirements, and design constraints. Such compromises, and the manner in which they are implemented, may further affect other technical aspects, such as system's computational complexity and power efficiency. At the same time, this difference in trade-offs may also add to the technical flexibility in addressing a broader range of communications applications, both static and mobile. In the communications method and apparatus of the present invention the control of the quality of service is performed through the change in the spectral efficiency (i.e., the data rate at a given bandwidth), and/or through changing the energy per bit as an additional trade-off parameter.

13.1 Aggregate Spread Pulse Modulation (ASPM)

For data communications, the present invention introduces the Aggregate Spread Pulse Modulation (ASPM), where the information is encoded in the amplitudes A_(j) and/or the “arrival times” k_(j) of the pulses in a digital designed “pulse train” {circumflex over (x)}[k] with only relatively small fraction of samples having non-zero values:

$\begin{matrix} {{{\hat{x}\lbrack k\rbrack} = {\sum\limits_{j}{{〚{k = k_{j}}〛}A_{j}}}},} & (82) \end{matrix}$ where k_(j) is the sample index of the j-th pulse, A_(j) is its amplitude, and the double square brackets denote the Iverson bracket [64]. The average “pulse rate” ƒ_(p) in such a train is ƒ_(p)=F_(s)/N_(p), where F_(s) is the sample rate, and N_(p)=

k_(j)−k_(j−1)

is the average interpulse interval. Note that for N_(p)>>1 the pulse rate is much smaller than the Nyquist rate. Also note that for N_(p)>>1 this train has a large PAPR even when |A_(j)|=const, and is generally unsuitable for use as a modulating signal.

However, the designed pulse train {circumflex over (x)}[k] given by (82) may be “re-shaped” by linear filtering:

$\begin{matrix} {{{x\lbrack k\rbrack} = {{\left( {\hat{x}*\hat{g}} \right)\lbrack k\rbrack} = {\sum\limits_{j}{A_{j}{\hat{g}\left\lbrack {k - k_{j}} \right\rbrack}}}}},} & (83) \end{matrix}$ where ĝ[k] is the impulse response of the filter and the asterisk denotes convolution. The filter ĝ[k] may be, for example, a lowpass filter with a given bandwidth B. If the filter ĝ[k] has a sufficiently large TBP [65, 66], most of the samples in the reshaped train x[k] will have non-zero values, and x[k] will have a much smaller PAPR than the designed sequence {circumflex over (x)}[k]. Such low-PAPR signal may then be used for modulating a carrier. If the combination of the amplitude A_(j) and the arrival time k_(j) of a pulse provides M distinct “states,” each pulse may encode log₂ M bits, the raw bit rate ƒ_(b) in such a train is ƒ_(b)=ƒ_(p) log₂ M, and such signaling may be referred to as “M-ary.” When B>>ƒ_(b)=(F_(s)/N_(p)) log₂ M, it would result in a low-rate message encoded in a wideband waveform.

For example, for the arrival times in (82) one may use k _(j) =jN _(p) +Δk[m _(j)],  (84) where Δk is a positive integer, 0≤Δk[m_(j)]<N_(p), and Δk[m]≠Δk[l] for m≠l. Then for m_(j)=1, 2, . . . , M and A_(j)=const the pulse train given by (82) encodes log₂ M bits per pulse. We may refer to such M-ary encoding with A_(j)=const as “unipolar.” Another bit may be added by using A_(j)=(−1)^(a) ^(j) , where a_(j) is either “0” or “1,” and we may refer to such signaling as “bipolar.” Then for bipolar M-ary signaling equation (82) may be rewritten as

$\begin{matrix} {{{\hat{x}\lbrack k\rbrack} = {\sum\limits_{j}{{〚{k = {{jN}_{p} + {\Delta{k\left\lbrack m_{j} \right\rbrack}}}}〛}\left( {- 1} \right)^{a_{j}}}}},} & (85) \end{matrix}$ where m_(j)=1, 2, . . . , M/2 and a_(j) is either “0” or “1.”

As discussed earlier in this disclosure, for a given designed pulse sequence x[k] the spectral, temporal and amplitude structures of the reshaped train x[k] would be determined by the choice of ĝ[k]. In particular, it may be desirable to select a filter ĝ[k] that minimizes the PAPR of x[k]. Note that if the time duration of ĝ[k] extends over multiple interpulse intervals, the instantaneous amplitudes and/or phases [67] of the resulting waveform are no longer representative of individual pulses. Instead, they are a “piled-up” aggregate of the contributions from multiple “stretched” pulses.

The key property of the large-TBP pulse shaping filter (PSF) ĝ[k] is that its autocorrelation function (ACF), i.e., the convolution of ĝ[k] with its matched filter g[k]=ĝ[−k], has a much smaller TBP, in particular, sufficiently smaller than the ratio B/ƒ_(p). Then, after demodulation and A/D conversion in the receiver, the encoded binary sequence may be recovered by filtering with g[k] and sampling the resulting pulse train at k=jN_(p)+Δk[m] (i.e., using g[k] as a decimation filter).

A good choice for the PSF would be a pulse that combines a small TBP of its ACF (e.g., close to that of a Gaussian pulse) with ACF's compact frequency support. An example would be a raised-cosine (RC) filter [68, e.g] with unity roll-off factor. The minimum required (Nyquist) sample rate for such a filter will be double its (baseband) physical bandwidth B, and the sample rate F_(s) may be expressed as F_(s)=2N_(s)B, where N_(s)≥1 is the oversampling factor. To minimize the power consumption, the memory usage, and the computational complexity of the digital processing, it may be beneficial to keep the sample rate in the transceivers as low as possible, i.e., to use N_(s)=1. Through the rest of the disclosure, we will typically assume sampling with the Nyquist rate F_(s)=2B.

Since for a given designed pulse sequence x[k] the temporal and amplitude structures of the reshaped train x[k] are determined by the PSF ĝ[k], these structures may be substantially different even for the pulse shaping filters with the same ACF. As discussed earlier, one may construct a great variety of large-TBP pulse shaping filters ĝ_(i)[k] with the same small-TBP ACF w[k], so that (ĝ_(i)*g_(i))[k]=w[k] for any i, while the convolutions of any ĝ_(i)(t) with g_(j)(t) for i≠j (cross-correlations) have large TBPs. Further, this property may also effectively hold for the PSFs ĥ_(i)[k] such that ĥ_(i)[k] approximates the discrete Hilbert transform of ĝ_(i)[k], i.e., ĥ_(i)[k]=H{ĝ_(i)[k]} [30, 69]. Therefore, using various PSFs combinations we may design different coherent and noncoherent modulation schemes with emphasis on particular spectral and/or temporal properties of the modulated signal.

13.1.1 Binary (“One Bit Per Pulse”) Encoding

For example, we may construct single-sideband, constant-envelope coherent and noncoherent ASPM configurations that use the “equidistant” designed train

$\begin{matrix} {{\hat{x}\lbrack k\rbrack} = {\sum\limits_{j}{{〚{k = {jN}_{p}}〛}\left( {- 1} \right)^{b_{j}}}}} & (86) \end{matrix}$ to encode the binary sequence (b₁ b₂ . . . b_(j) . . . ). The raw bit rate ƒ_(b) in such a train is ƒ_(b)=F_(s)/N_(p), where F_(s) is the sample rate and N_(p) is the number of samples between pulses.

The main challenge for using coherent ASPM for LPWANs may be the need for carrier recovery. At low SNR (e.g. <−20 dB), combined with significant delay and Doppler spreads in multipath environments, such recovery may perhaps be the most difficult and expensive aspect of a coherent ASPM receiver design. In addition, for example, the Costas loop [70] is ineffective for carrier recovery in single-sideband modulation. Favorably, an ASPM link may be modified, in various ways, to enable noncoherent detection that does not require precise carrier synchronization, neither in phase nor frequency, making such a link more attractive for use in LPWANs.

It may be further shown that, predictably, for an AWGN channel the uncoded BER P_(b) of these binary ASPM configurations may be expressed as

$\begin{matrix} {\begin{matrix} {P_{b} = {{\frac{1}{2}{erfc}\left( \sqrt{\frac{E_{b}}{N_{0}}} \right)} = {\frac{1}{2}{{erfc}\left( \sqrt{\frac{N_{p}\Gamma}{2}} \right)}({coherent})}}} \\ {P_{b} = {{\frac{1}{2}\exp\left( {- \frac{E_{b}}{2N_{0}}} \right)} = {\frac{1}{2}\exp\left( {- \frac{N_{p}\Gamma}{4}} \right)({noncoherent})}}} \end{matrix},} & (87) \end{matrix}$ where erfc(x) is the complementary error function [50], E_(b) is the energy per bit, N₀ is the (one-sided) power spectral density of the noise, and Γ denotes the SNR defined as Γ=(E_(b)/N₀)×(ƒ_(b)/B). Thus, at a given bandwidth, in such binary ASPM the control of the quality of service may be performed through the change in the interpulse interval N_(p), i.e., the data rate.

13.2 M-ary ASPM

In the binary ASPM, each pulse encodes one bit, hence the energy per bit E_(b) and the energy per pulse E_(p) are equal to each other, E_(b)=E_(p). By encoding log₂ M bits per pulse with the same energy, the energy per bit is reduced to E_(b)=E_(p)/log₂ M. Such encoding may be especially useful for improving the ASPM's energy per bit performance, thus increasing its range and overall energy efficiency, and making it more attractive for use in LPWANs.

13.2.1 Single-Sideband M-ary ASPM with Constant-Envelope Pulses

For example, FIG. 108 illustrates a transmit (Tx) part of a single-sideband M-ary ASPM link which uses constant-envelope transmitted pulses and is suitable for both coherent and noncoherent detection.

In FIG. 108 , the designed pulse train {circumflex over (x)}[k] according to (85) is filtered with ĝ[k] and ĥ[k] to form the shaped trains x_(g)[k] and x_(h)[k]. After digital-to-analog (D/A) conversion, x_(g)(t) and x_(h)(t) are used for quadrature amplitude modulation of a carrier with frequency ƒ_(c), providing the transmitted waveform x_(g)(t)sin(2πƒ_(c)t)+x_(h)(t) cos(2πƒ_(c)t). If ĝ[k] and ĥ[k] are, say, the real and imaginary parts, respectively, of a nonlinear chirp with the desired ACF, e.g. ĝ[k]+iĥ[k]=[[0≤k≤n]]exp(iΦ[k]),  (88) where Φ[k] is the phase, then this waveform will occupy only a single sideband with the physical bandwidth B equal to the baseband bandwidth of the chirp. In addition, if the pulses do not overlap (e.g., N_(p)>n+max_(m)(Δk[m])), this waveform will consist of constant-envelope pulses.

For example, the phase Φ(t) may be obtained as Φ(t)=φ₀+ω₀ t+∫dt∫dtγ(t),  (89) where φ₀=const, ω₀=const, ∫dx ƒ(x) denotes an antiderivative of ƒ(x), and where the chirp parameter (instantaneous chirp rate) γ(t) is chosen in such a way as to ensure the desired temporal and/or spectral shapes of the ACFs of ĝ[k] and ĥ[k], and their bandwidths. Note that from (89) it follows that

${\frac{d^{2}}{{dt}^{2}}{\Phi(t)}} = {{\gamma(t)}.}$

Note that, as in the above, in this disclosure we may interchangeably employ continuous-time (analog) and discrete (digital) representations for time-varying quantities. We use the analog representation of a signal x(t) when there are no explicit constraints on its bandwidth. When a discrete (digital) representation x[k] is used, it may be assumed that x(t) is band-limited, and it is appropriately sampled so that x(t) may be accurately determined by and/or obtained from x[k].

FIG. 109 further illustrates a receive part of a single-sideband M-ary ASPM link which uses noncoherent and/or coherent detection.

For noncoherent detection, in the receiver's (Rx) quadrature demodulator the noisy passband signal is multiplied by the orthogonal sinusoidal signals from a local oscillator, low-passed, and converted to the in-phase and quadrature digital signals I[k] and Q[k]. Filtering I[k] and Q[k] with the pairs of the filters g[k] and h[k], as shown in FIG. 109 , produces the signal components I*g+Q*h and Q*g−I*h. Further, the sum of squares of these components forms the unipolar pulse train y_(nc) ²=(I*g+Q*h)²+(Q*g−I*h)² with the peaks corresponding to the pulses in the designed train {circumflex over (x)}[k]. For coherent detection, after multiplication by sin(2πƒ_(c)t+π/4), lowpass filtering, and A/D conversion in the receiver, the resulting signal x_(rx)[k] is filtered with g[k]+h[k] to form the bipolar baseband pulse train y_(c)=x_(rx)*(g+h) corresponding to the designed train {circumflex over (x)}[k].

Without loss of generality, the ACFs of ĝ[k] and ĥ[k] may be normalized to have the peak magnitudes equal to unity. Then, to avoid the interpulse interference in both coherent and noncoherent detection, we may require that w[Δk[m]−Δk[l]]=v ² [Δk[m]−Δk[l]]=[[m=l]],  (90) where w[k]=½(ĝ*g+ĥ*h) and v ²[k]=¼[(ĝ*g+ĥ*h)²+(ĥ*g−ĝ*h)²],  (91)

Note that, once synchronization has been performed and is being maintained, the filters g[k] and h[k] in the receiver may be used for downsampling as decimation filters, without the need to perform full convolutions. For example, if ĝ[k] and ĥ[k] are FIR filters of order n (e.g. satisfying (88)), then for coherent detection the sample of y_(c)[k] at k=l may be obtained as

$\begin{matrix} {{y_{c}\lbrack l\rbrack} = {\sum\limits_{k}{{〚{0 \leq {k - l} < n}〛}{x_{rx}\lbrack k\rbrack}{\left( {{\hat{g}\left\lbrack {k - l} \right\rbrack} + {\hat{h}\left\lbrack {k - l} \right\rbrack}} \right).}}}} & (92) \end{matrix}$

One skilled in the art will recognize that the demodulation and the respective filtering in the receiver for both noncoherent and coherent detection may be performed by a variety of alternative ways, such that would result in effectively equivalent pulse trains suitable for detection and extraction of the information. For example, for coherent detection a quadrature receiver may be used. Then, after A/D conversion, the I and Q components are first filtered with g[k] and h[k], respectively, and then combined (summed) to form the baseband pulse train. Or, a Weaver demodulator [71] may be used to obtain the demodulated signal components.

Also note that the A/D conversion in the ASPM receiver may be combined with intermittently nonlinear filtering (INF) described in this disclosure, to make the link robust to outlier interferences, e.g. impulsive noise commonly present in industrial environments, and to increase the baseband SNR in the presence of such interferences. Since in the power-limited regime the channel capacity is proportional to the SNR, even relatively small increase in the latter would be beneficial.

FIGS. 108 and 109 illustrate an M-ASPM link with M=8 (three bits per pulse) for noncoherent detection and M=16 (four bits per pulse) for coherent detection. In the designed pulse train, each j-th pulse has 7 possible non-zero offsets from jN_(p), i.e., 8 distinct locations relative to jN_(p). In the receiver, after the filtering, 8 samples are obtained for each pulse. If the receiver is properly synchronized, these samples allow us to decode the information encoded in the designed train.

By encoding more bits per pulse with the same energy E_(p), the energy per bit E_(b) may be further reduced, to E_(b)=E_(p)/log₂ M.

For example, FIGS. 110 and 111 illustrate a single-sideband, constant-envelope M-ASPM link with M=32 (five bits per pulse) for noncoherent detection and M=64 (six bits per pulse) for coherent detection. FIG. 110 illustrates the transmit part, and FIG. 111 illustrates the receive part of the link. In the designed pulse train, each j-th pulse has 31 possible non-zero offsets from jN_(p), i.e., 32 distinct locations relative to jN_(p). In the receiver, after the filtering, 32 samples are obtained for each pulse. If the receiver is properly synchronized, these samples allow us to decode the information encoded in the designed train.

One skilled in the art will recognize that for large-order PSFs (e.g. large n in (88)) and sufficiently large M it may be less computationally expensive to perform the filtering with g[k] and h[k] in the receiver as discrete Fourier transform (DFT)-based FIR filtering. Such filtering, e.g., was used to obtain the samples of the signals I*g+Q*h, Q*g−I*h, y_(nc) ² and y_(c) shown in FIG. 111 .

13.3 Uncoded BER Performance of M-Ary ASPM in AWGN Channel 13.3.1 Noncoherent M-ASPM

Let us assume that we transmit the j-th pulse with m_(j)=1, and in the receiver sample at jN_(p)+{Δk[1], Δk[2], . . . , Δk[M]}. If y_(m) ²=y_(nc) ²[jN_(p)+Δk[m]], then the j-th symbol will be detected correctly when y₁ ²>max{y₂ ², y₃ ², . . . , y_(M) ²}.

For AWGN with constant power density No, and in the absence of interpulse interference, Y_(m) ² for m>1 may be viewed as i.i.d. variables having chi-square distribution with 2 degrees of freedom [50]. At the same time, Y₁ ² will have the noncentral chi-square distribution with 2 degrees of freedom and the noncentrality parameter λ proportional to the peak power of the “ideal” pulse [50], and its cumulative distribution function may be expressed as F _(Y) ₁ ₂ (x)=1−Q ₁(√{square root over (λ)},√{square root over (x)}),  (93) where Q₁(a, b) is the Marcum Q-function defined as the integral

$\begin{matrix} {{Q_{1}\left( {a,b} \right)} = {\int_{b}^{\infty}{{dx}x{\exp\left( {- \frac{x^{2} + a^{2}}{2}} \right)}{I_{0}({ax})}}}} & (94) \end{matrix}$ for a, b≥0, and where I₀(x) is the modified Bessel function of the first kind [72].

Then it may be further shown that the bit error probability P_(b)(λ) of noncoherent M-ASPM for AWGN channel may be expressed as

$\begin{matrix} {{{P_{b}(\lambda)} = {\frac{1}{2\left( {M - 1} \right)}{\sum\limits_{k = 2}^{M}{\left( {- 1} \right)^{k}\begin{pmatrix} M \\ k \end{pmatrix}{\exp\left( {{- \frac{k - 1}{2k}}\lambda} \right)}}}}},} & (95) \end{matrix}$ where

$\begin{pmatrix} n \\ m \end{pmatrix} = \frac{n!}{{\left( {n - m} \right)!}{m!}}$ is the binomial coefficient.

The noncentrality parameter λ is the ratio of the baseband peak signal power A² and the noise power σ_(n) ², λ=A²/σ_(n) ², and it may be expressed in several different ways, for example

$\begin{matrix} {{\lambda = {{\frac{2E_{b}}{N_{0}}\log_{2}M} = {{\frac{2\sigma_{c}^{2}}{N_{0}f_{b}}\log_{2}M} = {{2N_{p}\frac{\sigma_{c}^{2}}{N_{0}F_{s}}} = {N_{p}\Gamma}}}}},} & (96) \end{matrix}$ where σ_(c) ² is the power of the modulated carrier, thus describing the service quality in terms of different physical and numerical parameters of the link. In (96), as before, the SNR is defined as Γ=(E_(b)/N₀)×(ƒ_(b)/B). Note that the spreading factor in the M-ASPM is B/ƒ_(b)=N_(p)/(2 log₂ M). Then, for example, in terms of the energy per bit γ_(b)=E_(b)/N₀, the bit error probability of noncoherent M-ASPM is

$\begin{matrix} {{P_{b}\left( \gamma_{b} \right)} = {\frac{1}{2\left( {M - 1} \right)}{\sum\limits_{k = 2}^{M}{\left( {- 1} \right)^{k}\begin{pmatrix} M \\ k \end{pmatrix}{{\exp\left( {{- \frac{k - 1}{k}}\gamma_{b}\log_{2}M} \right)}.}}}}} & (97) \end{matrix}$

Note that, for a given γ_(b), this bit error probability is a decreasing function of M and, for M≥64, is the same as the bit error probability of noncoherent LoRa with the spreading factor SF=log₂ M [73].

13.3.2 E_(b)/N₀ Efficiency of Coherent M-ASPM

By using additional M/2 distinct pulse locations in the binary coherent ASPM, each pulse may encode m=log₂ M bits. For example, for M=16, the pulse train

$\begin{matrix} {{{\hat{x}\lbrack k\rbrack} = {\sum\limits_{j}{{〚{k = {{jN}_{p} + {\left( {{4a_{j}} + {2b_{c}} + c_{j}} \right)n}}}〛}\left( {- 1} \right)^{d_{j}}}}},} & (98) \end{matrix}$ where n is a nonzero integer, encodes a 4-bit sequence (a₁b₁c₁d₁ a₂b₂c₂d₂ . . . a_(j)b_(j)c_(j)d_(j) . . . ). To correctly identify a symbol in such M-ASPM, we would need to correctly detect both the arrival time and the polarity of the pulse.

When the arrival time of a pulse with the peak magnitude |A| is known, the probability of correctly detecting the polarity of this pulse in the presence of AWGN with zero mean and variance σ_(n) ² may be expressed, using the complementary error function, as ½ erfc(−μ), where μ=|A|/(σ_(n)√{square root over (2)}). We may further assume that n in (98) is sufficiently large, and thus interpulse interference is negligible (e.g. n≥2 for coherent detection and pulse shaping with the ACF as an RC pulse with unity roll-off factor). Then, for a pulse train with the peak magnitude of the pulses equal to |A|, and m=log₂ M bits per pulse encoding, the bit error probability may be expressed as

$\begin{matrix} {{{P_{b}(\mu)} = {\frac{M}{2\left( {M - 1} \right)}\left\lbrack {1 - {\frac{1}{2}{{erfc}\left( {- \mu} \right)}{P\left( {{❘X_{1}❘} > \mathcal{M}} \right)}}} \right\rbrack}},} & (99) \end{matrix}$ where X₁ is a normal random variable with mean μ∝|A| and variance ½, and

$\begin{matrix} {{\mathcal{M} = {\max\left\{ {{❘X_{2}❘},{❘X_{3}❘},\ldots,{❘X_{\frac{M}{2}}❘}} \right\}}},} & (100) \end{matrix}$ where X_(i), i=2, 3, . . . , M/2, are i.i.d. normal variables with zero mean and variance ½.

For Y=|X₁|, its cumulative distribution function is that of the folded normal distribution, which may be expressed as

$\begin{matrix} {{F_{Y}\left( {x;\mu} \right)} = {\frac{1}{2}\left\lbrack {{{erf}\left( {x + \mu} \right)} + {{erf}\left( {x - \mu} \right)}} \right\rbrack}} & (101) \end{matrix}$ for x≥0. Then the probability to correctly detect the arrival time of the pulse is

$\begin{matrix} {\begin{matrix} {{P\left( {{❘X_{1}❘} > \mathcal{M}} \right)} = {\int_{0}^{\infty}{{{dx}\left\lbrack {F_{Y}\left( {x;0} \right)} \right\rbrack}^{\frac{M}{2} - 1}\frac{d}{dx}{F_{Y}\left( {x;\mu} \right)}}}} \\ {= {\int_{0}^{\infty}{{{dx}\left\lbrack {{erf}(x)} \right\rbrack}^{\frac{M}{2} - 1}\left\{ {\frac{1}{\sqrt{\pi}}\left\lbrack {e^{- {({x + \mu})}^{2}} + e^{- {({x - \mu})}^{2}}} \right\rbrack} \right\}}}} \end{matrix}.} & (102) \end{matrix}$ For μ=0 the right-hand-side integral in (102) is equal to 2/M, and for μ>0 it may be evaluated numerically.

For coherent detection, the ratio of the baseband peak signal power A² and the noise power n is the same as for noncoherent detection, and thus μ=|A|/(σ_(n)√{square root over (2)})=√{square root over (λ/2)}, where λ is the noncentrality parameter of the noncoherent ASPM given by (96). Then, for example,

$\begin{matrix} {{\mu = {\sqrt{\frac{E_{b}}{N_{0}}\log_{2}M} = \sqrt{\frac{N_{p}\Gamma}{2}}}},} & (103) \end{matrix}$ where Γ=(E_(b)/N₀)×(ƒ_(b)/B) is the SNR. The bit rate ƒ_(b) is related to the pulse rate ƒ_(p) as ƒ_(b)=ƒ_(p) log₂ M, and, as before, the spreading factor in the M-ASPM is B/ƒ_(b)=N_(p)/(2 log₂ M).

As was mentioned at the beginning of Section 13, various trade-offs among the bandwidth, data rates, and energy per bit may have different effects on the quality of service under different propagation conditions (e.g. fading and multipath), Doppler spreads, interference scenarios, multi-user requirements, and design constraints. Such compromises, and the manner in which they are implemented, may further affect other technical aspects, such as system's computational complexity and power efficiency. At the same time, this difference in trade-offs also adds to the technical flexibility in addressing a broader range of LPWAN applications. In the binary ASPM the control of the quality of service is performed through the change in the spectral efficiency, i.e., the data rate at a given bandwidth. Implementing M-ary encoding in ASPM further enables controlling service quality through changing the energy per bit (in about an order of magnitude range) as an additional trade-off parameter. Such encoding may be especially useful for improving the ASPM's energy per bit performance, thus increasing its range and overall energy efficiency, and making it more attractive for use in LPWANs.

For example, FIG. 112 illustrates uncoded BER vs. E_(b)/N₀ performances of coherent and noncoherent M-ASPM in AWGN channel for several values of M. Further, FIG. 113 illustrates that the quality of service (here the uncoded BER in AWGN channel) may be controlled by the change in the ASPM's spectral efficiency ƒ_(b)/B (e.g. by changing the average interpulse interval N_(p)), as well as by the change in the number of bits per pulse (log₂ M).

FIG. 113 shows uncoded BER vs. SNR performance of coherent and noncoherent M-ASPM in AWGN channel for several values of M. By changing the average interpulse interval N_(p), the uncoded BER=10⁻² is achieved at the same SNR=−15 dB for all M, and for both coherent and noncoherent detection.

13.4 Other M-ASPM Variants

It would be obvious to one skilled in the art that in the spirit and scope of this invention M-ASPM arrangements may be varied in many ways.

For example, instead of a single designed pulse train with the information encoded in the polarities and the arrival times of the pulses (e.g., (85)), the information may be encoded in a plurality of equidistant designed pulse trains {circumflex over (x)}_(m)[k],

$\begin{matrix} {{{{\hat{x}}_{m}\lbrack k\rbrack} = {\sum\limits_{j}{{{〚{k = {jN}_{p}}〛}〚{m = m_{j}}〛}\left( {- 1} \right)^{a_{j}}}}},} & (104) \end{matrix}$ where m_(j)=1, 2, . . . , M. This plurality of trains may encode log₂M bits for noncoherent detection (M-ASPM), and 1+log₂ M bits for coherent detection ((2M)-ASPM).

The shaped trains x_(g)[k] and x_(h)[k] may be formed as

$\begin{matrix} \left\{ {\begin{matrix} {{x_{I}\lbrack k\rbrack} = {{\sum\limits_{m = 1}^{M}{\left( {{\hat{x}}_{m}*{\hat{g}}_{m}} \right)\lbrack k\rbrack}} = {\sum\limits_{j}{{〚{m = m_{j}}〛}{{\hat{g}}_{m}\left\lbrack {k - {jN}_{p}} \right\rbrack}\left( {- 1} \right)^{a_{j}}}}}} \\ {{x_{Q}\lbrack k\rbrack} = {{\sum\limits_{m = 1}^{M}{\left( {{\hat{x}}_{m}*{\hat{h}}_{m}} \right)\lbrack k\rbrack}} = {\sum\limits_{j}{{〚{m = m_{j}}〛}{{\hat{h}}_{m}\left\lbrack {k - {jN}_{p}} \right\rbrack}\left( {- 1} \right)^{a_{j}}}}}} \end{matrix},} \right. & (105) \end{matrix}$ where ĝ_(m))[k] and ĥ_(m))[k] are large-TBP PSFs with the desired spectral content. For example, if ĝ_(m)[k] and ĥ_(m)[k] are the real and imaginary parts of a nonlinear chirp with the desired ACF, e.g. ĝ _(m)[k]+iĥ _(m)[k]=[[0≤k<N _(p)]]exp(iΦ _(m)[k]),  (106) where Φ_(m)[k] is the phase, then x_(g)[k] and x_(h)[k] may be used for single-sideband constant-envelope modulation.

Without loss of generality, we may require that the large-TBP filters ĝ_(m)[k] and ĥ_(m)[k] satisfy the following mutual orthogonality properties:

$\begin{matrix} \left\{ {\begin{matrix} {{\sum\limits_{n = 0}^{N_{p} - 1}{{{\hat{g}}_{m}\lbrack n\rbrack}{{\hat{g}}_{l}\lbrack n\rbrack}}} \approx {\sum\limits_{n = 0}^{N_{p} - 1}{{{\hat{h}}_{m}\lbrack n\rbrack}{{\hat{h}}_{l}\lbrack n\rbrack}}} \approx {〚{m = l}〛}} \\ {{\sum\limits_{n = 0}^{N_{p} - 1}{{{\hat{g}}_{m}\lbrack n\rbrack}{{\hat{h}}_{l}\lbrack n\rbrack}}} \approx 0} \end{matrix}.} \right. & (107) \end{matrix}$

Then, by using decimation filtering with the respective matched filters g_(m)[k] and h_(m)[k] in the receiver, for each j-th pulse one may obtain M samples for extracting the information encoded in the plurality of designed pulse trains (104).

For example, for coherent detection

$\begin{matrix} {\begin{matrix} {{p_{j}\lbrack m\rbrack} = {\sum\limits_{k}{{〚{0 \leq {k - {jN}_{p}} < N_{p}}〛}{x_{I}\lbrack k\rbrack}{{\hat{g}}_{m}\left\lbrack {k - {jN}_{p}} \right\rbrack}}}} \\ {\approx {\sum\limits_{k}{{〚{0 \leq {k - {jN}_{p}} < N_{p}}〛}{x_{Q}\lbrack k\rbrack}{{\hat{h}}_{m}\left\lbrack {k - {jN}_{p}} \right\rbrack}}}} \\ {\approx {{〚{m - m_{j}}〛}\left( {- 1} \right)^{a_{j}}}} \end{matrix}.} & (108) \end{matrix}$ This is illustrated in FIG. 114 .

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Regarding the invention being thus described, it will be obvious that the same may be varied in many ways. Such variations are not to be regarded as a departure from the spirit and scope of the invention, and all such modifications as would be obvious to one skilled in the art are intended to be included within the scope of the claims. It is to be understood that while certain now preferred forms of this invention have been illustrated and described, it is not limited thereto except insofar as such limitations are included in the following claims. 

I claim:
 1. A method for conveying information from a transmitter to a receiver comprising the steps of: a) encoding said information into a digital pulse train, wherein said digital pulse train is characterized by a sampling rate and by an average pulse rate, and wherein said pulse rate is much smaller than said sampling rate; b) converting said digital pulse train into a modulating component, wherein said modulating component is characterized by limited bandwidth and by low peakedness; c) generating a physical communication signal by modulating a carrier signal with a modulating signal, wherein said modulating signal comprises said modulating component; d) transmitting said physical communication signal by said transmitter; e) receiving said physical communication signal by said receiver to obtain a received signal; f) converting said received signal into a demodulated receiver signal, wherein said demodulated receiver signal comprises a digital demodulated component, and wherein said digital demodulated component is representative of said modulating component; g) applying a digital receiver filter to said digital demodulated component, wherein said digital receiver filter converts said digital demodulated component into a component of a receiver digital pulse train, wherein said receiver digital pulse train is characterized by said limited bandwidth and by high peakedness, and wherein said information is represented in said receiver digital pulse train, and h) extracting said information from said receiver digital pulse train.
 2. The method of claim 1 wherein said information is encoded into said digital pulse train by the quantities selected from the group consisting of: polarities of pulses in said digital designed pulse train, magnitudes of pulses in said digital pulse train, time intervals among pulses in said digital pulse train, and any combinations thereof.
 3. The method of claim 2 wherein said information is obtained from said receiver digital pulse train by measuring the quantities selected from the group consisting of: polarities of pulses in said receiver digital pulse train, magnitudes of pulses in said receiver digital pulse train, time intervals among pulses in said receiver digital pulse train, and any combinations thereof.
 4. The method of claim 1 wherein said conversion of said digital pulse train into said modulating component comprises filtering of said digital pulse train with a digital pulse shaping filter having a large time-bandwidth product, wherein the autocorrelation function of said digital pulse shaping filter has a small time-bandwidth product, and wherein said digital receiver filter is matched to said digital pulse shaping filter.
 5. The method of claim 4 wherein said information is encoded into said digital pulse train by the quantities selected from the group consisting of: polarities of pulses in said digital pulse train, magnitudes of pulses in said digital pulse train, time intervals among pulses in said digital pulse train, and any combinations thereof.
 6. The method of claim 5 wherein said information is obtained from said receiver digital pulse train by measuring the quantities selected from the group consisting of: polarities of pulses in said receiver digital pulse train, magnitudes of pulses in said receiver digital pulse train, time intervals among pulses in said receiver digital pulse train, and any combinations thereof.
 7. The method of claim 1 wherein said conveying of said information is characterized by a quality of service and wherein said quality of service is controlled by the quantities selected from the group consisting of: said sampling rate in said receiver digital pulse train, said average pulse rate in said receiver digital pulse train, number of encoded bits per pulse in said receiver digital pulse train, and any combinations thereof. 